2024 Purplemath - Purplemath. The "addition" method of solving systems of linear equations is also called the "elimination" method. Under either name, this method is similar to the method you probably used when you were first learning how to solve one-variable linear equations. Suppose, back in the day, they'd given you the equation " x + 6 = 11 ".

 
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Purplemath What is a circle? A circle is a geometrical shape. It is defined as having a center, and being the set of all points that are a certain fixed distance from that center. (The fixed distance is called the radius of the circle.) The circle is not of much use in algebra since the equation of a circle isn't a function. Purplemath What are a number's "factors"? "Factors" are the whole numbers you multiply to get another whole number. For instance, factors of 15 are 3 and 5, because 3 × 5 = 15. Some numbers have more than one factorization (more than one way of being factored). For instance, 12 can be factored as 1 ×12, 2 × 6, and also …3,000 + x. 0.075. 1. The total interest earned will be the sum of the interest from each of the two investments, so add down the I column to get the following equation: 150 + 0.09 x = (3,000 + x ) (0.075) To find the solution, solve for the value of x. Advertisement.You can solve this "space" problem by using negative numbers. The "whole" numbers start at zero and count off to the right; these are the positive integers. The negative integers start at zero and count off to the left: Note the arrowhead on the far right end of the number line above. That arrow tells you the direction in which the …Purplemath. Parallel lines and their slopes are easy. Since slope is a measure of the angle of a line from the horizontal, and since parallel lines must have the same angle, then parallel lines have the same slope — and lines with the same slope are parallel. Perpendicular lines are a bit more complicated. If you visualize a line with ...Purplemath. You've worked with trigonometric ratios — sine, cosine, tangent, secant, cosecant, and cotangent — in a geometrical context; that is, in the context of right triangles.. Now we'll move those ratios into an algebraic context (being the Cartesian plane), and then we'll dispense with the triangles.This will allow us to …Since the first differences are the same, this means that the rule is a linear polynomial, something of the form y = an + b. I will plug in the first couple of values from the sequence, and solve for the coefficients of the polynomial: 1 a + b = 5. 2 a + b = 7. This system solves as: So the formula is y = 2n + 3.Purplemath What is a ratio? A "ratio" is just a comparison between, or a relating of, two different things. Ratios are used to create proportions by setting two ratios equal to each other and solving for some unknown, and ratios can also be used to find per-unit rates such as how many mile a car can drive "per liter" or how many hours the average student at a … The Distance Formula is a variant of the Pythagorean Theorem that you used back in geometry. The Pythagorean Theorem allows you to relate the three sides of a right triangle; in particular, it allows you to find the length of the third side of a right triangle, given the lengths of the other two sides. The Distance Formula takes two points and ... The natural log is the base- e log, where e is the natural exponential, being a number that is approximately equal to 2.71828. The natural log has its own notation, being denoted as ln (x) and usually pronounced as "ell-enn-of- x ". (Note: That's "ell-enn", not "one-enn" or "eye-enn".) Just as the number π arises naturally in geometry, …Polynomial are sums (and differences) of polynomial "terms". For an expression to be a polynomial term, any variables in the expression must have whole-number powers (or else the "understood" power of 1, as in x1, which is normally written as x ). A plain number can also be a polynomial term. In particular, for an expression to be a polynomial ...Purplemath. The following examples provide some practice with stem-and-leaf plots, as well as explaining some details of formatting, and showing how to create a "key" for your plot. Subjects in a psychological study were timed while completing a certain task. Complete a stem-and-leaf plot for the following list of times:Then the GCF is 2 × 3 × 5 × 7 = 210.. On the other hand, the Least Common Multiple, the LCM, is the smallest ("least") number that both 2940 and 3150 will divide into. That is, it is the smallest number that contains both 2940 and 3150 as factors, the smallest number that is a multiple of both these values; it is the multiple …Lessons and Tutoring - Reviews. The reviews below refer to free (or free-to-try) off-site tutoring and instructional resources. To access the Purplemath lessons and tutoring forums, please use the links to the right. For paid in-home tutoring, please try here. algebra.help: This site has lessons on basic algebra topics and techniques, study ...can be written as 0.538461538461…. These two fractions are repeating decimals. In the first case, the repeated block is just 3; in the second case, the repeated block is 538461.. On the other hand, we have loads of other numbers whose decimal forms are non-repeating, non-terminating decimals; these number are non-rational (that is, they cannot be written as …To set up and solve number word problems, it is important clearly to label variables and expressions, using your translation skills to convert the words into algebra. The process of clear labelling will often end up doing nearly all of the work for you. Number word problems are usually fairly contrived, but they're also fairly standard.Then the GCF is 2 × 3 × 5 × 7 = 210.. On the other hand, the Least Common Multiple, the LCM, is the smallest ("least") number that both 2940 and 3150 will divide into. That is, it is the smallest number that contains both 2940 and 3150 as factors, the smallest number that is a multiple of both these values; it is the multiple … MathHelp.com. Step 1 in effectively translating and solving word problems is to read the problem entirely. Don't start trying to solve anything when you've only read half a sentence. Try first to get a feel for the whole problem; try first to see what information you have, and then figure out what you still need. The Purplemath algebra lessons are available in offline form for home use! This allows you to, for instance, review the lessons on your laptop while you ride the bus, or let your grandkids "surf" the site without having to provide them with a "live" Internet connection. The "Purplemath CD" contains the entire Purplemath web site, modified for ... To graph a log function: Always keep in mind that logs are inverses of exponentials; this will remind you of the shape you should expect the graph to have. Pick input values (that is, x -values) that are powers of the base; for instance, if the log's base is 5, then pick x -values like 52 and 5−1. List the corresponding y -values; for ...Purplemath. Unlike the examples on the previous page, nearly all polynomial divisions do not "come out even"; usually, you'll end up with a remainder. Divide 3x 3 − 5x 2 + 10x − 3 by 3x + 1; I start with the long-division set-up: Looking only at the leading terms, I divide 3x 3 by 3x to get x 2. This is what I put on top:Purplemath What is a vertical asymptote? Vertical asymptotes are vertical lines which correspond to the zeroes of the denominator of a rational function.The graph of the rational function will never cross or even touch the vertical asymptote(s), since this would cause division by zero. Introduction to Algebra. Algebra is great fun - you get to solve puzzles! A Puzzle. What is the missing number? The Binomial Theorem is a quick way (okay, it's a less slow way) of expanding (that is, of multiplying out) a binomial expression that has been raised to some (generally inconveniently large) power. For instance, the expression (3x − 2) is a binomial, 10 is a rather large exponent, and (3x − 2)10 would be very painful to multiply out by hand.The most basic reason that flip-n-multiply works is that division can be defined as "multiplying by the reciprocal". We define division as being the corresponding equality to a multiplication. For instance, we say that 8 ÷ ½ = 16 because 8 × 2 = 16. (The whole number 2, as a fraction, is \frac {2} {1} 12, which is the reciprocal of ½ .)Purplemath. Radians and degrees are two types of units for measuring angles. There are very many such units (such as "gradians" and "MRADs"), but degrees and radians are the ones you are most likely to encounter in high school and college. Degrees. Degrees are used to express both directionality and angle size.Purplemath. You've already learned the basic trig graphs. But just as you could make the basic quadratic, y = x2, more complicated, such as y = − (x + 5)2 − 3, so also trig graphs can be made more complicated. We can transform and translate trig functions, just like you transformed and translated other functions in algebra.Purplemath is a website that provides free math lessons and resources for students and teachers. It started in 1998 as a personal web site by Elizabeth Stapel, and has grown to … Purplemath What is a circle? A circle is a geometrical shape. It is defined as having a center, and being the set of all points that are a certain fixed distance from that center. (The fixed distance is called the radius of the circle.) The circle is not of much use in algebra since the equation of a circle isn't a function. The most basic reason that flip-n-multiply works is that division can be defined as "multiplying by the reciprocal". We define division as being the corresponding equality to a multiplication. For instance, we say that 8 ÷ ½ = 16 because 8 × 2 = 16. (The whole number 2, as a fraction, is \frac {2} {1} 12, which is the reciprocal of ½ .)To fix this "it depends on how you look at it" issue, mathematicians codified an ordering to the arithmetical operations of addition, subtraction, multiplication, division, repeated multiplication (that is, exponentiation), and grouping (that is, parentheticals). This codification of which comes before what is called "the order of operations".Here are some suggestions to help you prepare for the ALEKS math test. Start with an ALEKS math practice test. Create a plan to master the topics you need to learn. Follow a daily routine of ALEKS math test prep. Evaluate your learning. Get ALEKS math help with any difficult concepts. Trust your ability to achieve a good score. Purplemath is a website that provides free math lessons and resources for students and teachers. It started in 1998 as a personal web site by Elizabeth Stapel, and has grown to become a popular and trusted online resource for algebra, calculus, geometry, and more. Learn about its history, recognition, awards, software, and contact information. To fix this "it depends on how you look at it" issue, mathematicians codified an ordering to the arithmetical operations of addition, subtraction, multiplication, division, repeated multiplication (that is, exponentiation), and grouping (that is, parentheticals). This codification of which comes before what is called "the order of operations". The Algebra 1 course, often taught in the 9th grade, covers Linear equations, inequalities, functions, and graphs; Systems of equations and inequalities; Extension of the concept of a function; Exponential models; and Quadratic equations, functions, and graphs. Khan Academy's Algebra 1 course is built to deliver a comprehensive, illuminating, engaging, and Common Core aligned experience! Purplemath. The next level of this type of log equation may require a calculator to solve. You'll still find the solution using algebra, but they'll be wanting a decimal approximation for non-"nice" values, which will require "technology". An example would be: Solve ln(x) = 3, giving your answer accurate to three decimal places.You should know the formula for the circumference C and area A of a circle, given the radius r: Acir = π r2. Ccir = 2π r. (" π " is the number approximated by 3.14159 or the fraction 22/7) Remember that the radius of a circle is the distance from the center to the outside of a circle. In other words, the radius is just halfway across.The solving process works like this: 2 y − 4 x = 3. 2 y = 4 x + 3. y = 2 x + 1.5. Then we can graph as usual. By the way, it's often a good idea to use x -values which are spread out a bit. If the plotted points are too close together, we can end up not being quite sure of the angle of the line we're graphing.Sitejabber has helped over 200M buyers make better purchasing decisions online. Suspicious reviews are flagged by our algorithms, moderators, and community members. … Here are some suggestions to help you prepare for the ALEKS math test. Start with an ALEKS math practice test. Create a plan to master the topics you need to learn. Follow a daily routine of ALEKS math test prep. Evaluate your learning. Get ALEKS math help with any difficult concepts. Trust your ability to achieve a good score. To find the selling price per pound of the mixture, divide ( $139.60) by ( 20 pounds). Simplify the division to find the unit rate. Remember to put appropriate units (in this case, "dollars per pound") on your hand-in answer. Note that, in this case, no variable was actually necessary.Purplemath What is a circle? A circle is a geometrical shape. It is defined as having a center, and being the set of all points that are a certain fixed distance from that center. (The fixed distance is called the radius of the circle.) The circle is not of much use in algebra since the equation of a circle isn't a function.Purplemath. Once you've learned the basic keywords for translating word problems from English into mathematical expressions and equations, you'll be presented with various English expressions, and be told to perform the translation. Don't view the lists of keywords as holy writ, handed down from on high. Instead, use these lists … Solve x2 − 48 = 0. This quadratic expression has two terms, and nothing factors out, so either it's a difference of squares (which I can factor) or else it can be formatted as " (variable part) 2 equals (a number)" so I can square-root both sides. Since 48 is not a square, I can't apply the difference-of-squares formula. Learn how to find real-number solutions and factors of polynomials using synthetic division, rational roots test, and quadratic formula. See detailed steps and graphs for each … Purplemath is a website that provides free math lessons and resources for students and teachers. It started in 1998 as a personal web site by Elizabeth Stapel, and has grown to become a popular and trusted online resource for algebra, calculus, geometry, and more. Learn about its history, recognition, awards, software, and contact information. Purplemath Base 4. In base four, each digit in a number represents the number of copies of that power of four. That is, the first digit tells you how many ones you have; the second tells you how many fours you have; the third tells you how many sixteens (that is, how many four-times-fours) you have; the fourth tells you how many sixty … Purplemath. In the previous two pages, we've looked at solving one-step linear equations; that is, equations that require one addition or subtraction, or that require one multiplication or division. However, most linear equations require more than one step in order to find their solution. What steps then should be used, and in what order? Logarithms are inverse functions (backwards), and logs represent exponents (concept), and taking logs is the undoing of exponentials (backwards and a concept). And this is a lot to take in all at once. Yes, in a sense, logarithms are themselves exponents. Logarithms have bases, just as do exponentials; for instance, log5(25) …ALGEBRA 1 MATH.COM. ALGEBRA 1 ONLINE PRACTICE QUIZZES. ALGEBRA 1 PEARSON. ALGEBRA 1 PRENTICE HALL. ALGEBRA 1 PRENTICE ONLINE. …For the same reason, you can take any odd root (third root, fifth root, seventh root, etc.) of a negative number. Squaring a negative number multiplies it by itself, meaning two minus signs that cancel; e.g. (−3)² …Use completing the square to solve x2 − 4x − 8 = 0. As noted above, this quadratic does not factor, so I can't solve the equation by factoring. And they haven't given me the equation in a form that is ready to square-root. But there is a way for me to manipulate the quadratic to put it into that ready-for-square-rooting form, so I can solve.The solving process works like this: 2 y − 4 x = 3. 2 y = 4 x + 3. y = 2 x + 1.5. Then we can graph as usual. By the way, it's often a good idea to use x -values which are spread out a bit. If the plotted points are too close together, we can end up not being quite sure of the angle of the line we're graphing.Here are some suggestions to help you prepare for the ALEKS math test. Start with an ALEKS math practice test. Create a plan to master the topics you need to learn. Follow a daily routine of ALEKS math test prep. Evaluate your learning. Get ALEKS math help with any difficult concepts. Trust your ability to achieve a good score.An identity is a tautology, an equation or statement that is always true, no matter what you plug in for the variable. Learn how to prove an identity using logical steps and notation, …To be able to be combined, the terms' variable portions must contain the exact same variable (s) with the exact same power (s). Once you have determined that two terms are indeed "like" terms and can indeed therefore be combined, you can then deal with the terms in a manner similar to what you did in grammar school.Solve (x + 1) (x − 3) = 0. To solve this quadratic equation, I could multiply out the expression on the left-hand side, simplify to find the coefficients, plug those coefficient values into the … The solving process works like this: 2 y − 4 x = 3. 2 y = 4 x + 3. y = 2 x + 1.5. Then we can graph as usual. By the way, it's often a good idea to use x -values which are spread out a bit. If the plotted points are too close together, we can end up not being quite sure of the angle of the line we're graphing. Purplemath, Addison, Illinois. 3.3K likes · 82 talking about this. https://www.purplemath.com Need help with algebra? Try Purplemath's practical and …24 trailing zeroes in 101! This reasoning, of finding the number of multiples of 51 = 5, plus the number of multiples of 52 = 25, etc, extends to working with even larger factorials. Find the number of trailing zeroes in the expansion of 1000! Okay, there are 1000 ÷ 5 = 200 multiples of 5 between 1 and 1000. The next power of 5, …So my solution checks, and my answer is: \boldsymbol {\color {purple} { x = \frac {50} {3} }} x = 350. You can use the Mathway widget below to practice solving a linear equation by multiplying or dividing. Try the entered exercise, or type in your own exercise. Then click the button to compare your answer to Mathway's.Here are some suggestions to help you prepare for the ALEKS math test. Start with an ALEKS math practice test. Create a plan to master the topics you need to learn. Follow a daily routine of ALEKS math test prep. Evaluate your learning. Get ALEKS math help with any difficult concepts. Trust your ability to achieve a good score. You should know the formula for the circumference C and area A of a circle, given the radius r: Acir = π r2. Ccir = 2π r. (" π " is the number approximated by 3.14159 or the fraction 22/7) Remember that the radius of a circle is the distance from the center to the outside of a circle. In other words, the radius is just halfway across. Purplemath. A ratio is one thing or value compared with or related to another thing or value; it is just a statement or an expression, and can only perhaps be simplified or reduced. On the other hand, a proportion is two ratios which have been set equal to each other; a proportion is an equation that can be solved. ...The Algebra 1 course, often taught in the 9th grade, covers Linear equations, inequalities, functions, and graphs; Systems of equations and inequalities; Extension of the concept of a function; Exponential models; and Quadratic equations, functions, and graphs. Khan Academy's Algebra 1 course is built to deliver a comprehensive, illuminating, engaging, … Purplemath. A ratio is one thing or value compared with or related to another thing or value; it is just a statement or an expression, and can only perhaps be simplified or reduced. On the other hand, a proportion is two ratios which have been set equal to each other; a proportion is an equation that can be solved. Then the GCF is 2 × 3 × 5 × 7 = 210. On the other hand, the Least Common Multiple, the LCM, is the smallest (that is, the "least") number that both 2940 and 3150 will divide into. That is, it is the smallest number that contains both 2940 and 3150 as factors, the smallest number that is a *multiple* that is common to both these values. Therefore, it will be the … Purplemath's "Homework Guidelines for Mathematics" will give you a leg up, explaining in clear terms what your math teacher is looking for. The Guidelines link to examples of common errors, and demonstrate techniques that your instructors will love! In addition, students who get in the habit of explaining themselves clearly in their homework ... Purplemath. An arithmetic series is the sum of the terms of an arithmetic sequence. A geometric series is the sum of the terms of a geometric sequence. There are other types of series, but you're unlikely to work with them much until you're in calculus. For now, you'll probably mostly work with these two. This page explains and illustrates …Purplemath. Radians and degrees are two types of units for measuring angles. There are very many such units (such as "gradians" and "MRADs"), but degrees and radians are the ones you are most likely to encounter in high school and college. Degrees. Degrees are used to express both directionality and angle size.Purplemath. The "addition" method of solving systems of linear equations is also called the "elimination" method. Under either name, this method is similar to the method you …Purplemath. A very common class of "proportions" exercise is that of finding the height of something very tall by using the daytime shadow length of that same thing, its shadow being measured horizontally along the ground. In such an exercise, we use the known height of something shorter, along with the length of that shorter …This proportionality of corresponding sides can be used to find the length of a side of a figure, given a similar figure for which sufficient measurements are known. In the displayed triangles, the lengths of the sides are given by A = 48 mm, B = 81 mm, C = 68 mm, and a = 21 mm. Find the lengths of sides b and c, rounded to the nearest …Classify the following equations according to the type of conic each represents: A) 3 x2 + 3 y2 − 6 x + 9 y − 14 = 0. B) 6 x2 + 12 x − y + 15 = 0. C) x2 + 2 y2 + 4 x + 2 y − 27 = 0. D) x2 − y2 + 3 x − 2 y − 43 = 0. A) Both variables are squared, and both squared terms are multiplied by the same number, so this is a circle.Purplemath Base 4. In base four, each digit in a number represents the number of copies of that power of four. That is, the first digit tells you how many ones you have; the second tells you how many fours you have; the third tells you how many sixteens (that is, how many four-times-fours) you have; the fourth tells you how many sixty … Pre-algebra and algebra lessons, from negative numbers through pre-calculus. Grouped by level of study. Lessons are practical in nature informal in tone, and contain many worked examples and warnings about problem areas and probable "trick" questions. Purplemath. The first type of logarithmic equation has two logs, each having the same base, which have been set equal to each other. We solve this sort of equation by setting the insides (that is, setting the "arguments") of the logarithmic expressions equal to each other. For example: Solve log 2 (x) = log 2 (14).The Purplemath lessons try not to assume any fixed ordering of topics, so that any student, regardless of the textbook being, may benefit. While the structure of the Purplemath lessons lends itself to many topical orderings, the following is one possible lesson sequence. To do your self-study, follow this sequence by working down the left-hand ... You should know the formula for the circumference C and area A of a circle, given the radius r: Acir = π r2. Ccir = 2π r. (" π " is the number approximated by 3.14159 or the fraction 22/7) Remember that the radius of a circle is the distance from the center to the outside of a circle. In other words, the radius is just halfway across. Purplemath What is a ratio? A "ratio" is just a comparison between, or a relating of, two different things. Ratios are used to create proportions by setting two ratios equal to each other and solving for some unknown, and ratios can also be used to find per-unit rates such as how many mile a car can drive "per liter" or how many hours the average student at a given university spends studying ... Purplemath. The graph of a parabola will not pass the Horizontal Line Test; there are loads of horizontal lines that will cross the graph twice. So the inverse of a parabola's quadratic function will not itself be a function. However, sometimes a non-invertible function can be converted into an invertible one by restricting the domain.To be able to be combined, the terms' variable portions must contain the exact same variable (s) with the exact same power (s). Once you have determined that two terms are indeed "like" terms and can indeed therefore be combined, you can then deal with the terms in a manner similar to what you did in grammar school.Purplemath What is engineering notation? Engineering notation is similar to scientific notation, in that numbers are converted to (a number) times (10 raised to some power). But the powers in engineering notation will always be multiples of 3.. Because the powers are always multiples of three, the resulting numbers …Purplemath. You may be asked about the "correlation", if any, displayed within a particular scatterplot. The word orrelation can be used in at least two different ways: to refer to how well an equation matches the scatterplot, or to refer to the way in which the dots line up. If you're asked about "positive" or "negative" correlation, …Shv airport, Fit2run, Univision portland, Sick new world festival, Hurts donuts springfield mo, Lubbock sports medicine, Meijer kenosha, Saguaro lake ranch, Charlestons restaurant, Blain's farm and fleet romeoville, Shredd, Otter swimming, Air techniques, Eddie 9v

3.141 | 59265... The number in the fourth place is a 5, which is the cut-off for rounding: if the number in the next place (after the one you're rounding to) is 5 or greater, you round up. In this case, the 1 becomes a 2, the 59265... part disappears, and π, rounded to three decimal places, is: 3.142. Content Continues Below.. Valley humane society

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Purplemath What are a number's "factors"? "Factors" are the whole numbers you multiply to get another whole number. For instance, factors of 15 are 3 and 5, because 3 × 5 = 15. Some numbers have more than one factorization (more than one way of being factored). For instance, 12 can be factored as 1 ×12, 2 × 6, and also as 3 × 4.You should know the formula for the circumference C and area A of a circle, given the radius r: Acir = π r2. Ccir = 2π r. (" π " is the number approximated by 3.14159 or the fraction 22/7) Remember that the radius of a circle is the distance from the center to the outside of a circle. In other words, the radius is just halfway across.Purplemath What is synthetic division? Synthetic division is a shorthand, or shortcut, method of polynomial division in the special case of dividing by a linear factor — and it only works in this case. Synthetic division is generally used, however, not for dividing out factors but for finding zeroes (or roots) of polynomials.Purplemath, Addison, Illinois. 3.3K likes · 82 talking about this. https://www.purplemath.com Need help with algebra? Try Purplemath's practical and …can be written as 0.538461538461…. These two fractions are repeating decimals. In the first case, the repeated block is just 3; in the second case, the repeated block is 538461.. On the other hand, we have loads of other numbers whose decimal forms are non-repeating, non-terminating decimals; these number are non-rational (that is, they cannot be written as …The take-aways from this page are the following rules for adding and subtracting with negative numbers: If you're adding two negative numbers, then add in the usual way, remembering to put a "minus" sign on the result. Example: −2 + (−3) = −5. If you're adding a positive number and a negative number, subtract the smaller number (that is ... Classify the following equations according to the type of conic each represents: A) 3 x2 + 3 y2 − 6 x + 9 y − 14 = 0. B) 6 x2 + 12 x − y + 15 = 0. C) x2 + 2 y2 + 4 x + 2 y − 27 = 0. D) x2 − y2 + 3 x − 2 y − 43 = 0. A) Both variables are squared, and both squared terms are multiplied by the same number, so this is a circle. Purplemath What is a ratio? A "ratio" is just a comparison between, or a relating of, two different things. Ratios are used to create proportions by setting two ratios equal to each other and solving for some unknown, and ratios can also be used to find per-unit rates such as how many mile a car can drive "per liter" or how many hours the average student at a …Purplemath. Venn diagrams were invented by a guy named John Venn (no kidding; that was really his name) as a way of picturing relationships between different groups of things. Inventing this type of diagram was, apparently, pretty much all John Venn ever accomplished. To add insult to injury, much of what we refer to as "Venn …Also, this hyperbola's foci and vertices are to the left and right of the center, on a horizontal line paralleling the x -axis. From the equation, clearly the center is at (h, k) = (−3, 2). Since the vertices are a = 4 units to either side, then they are at the points (−7, 2) and at (1, 2). The equation a2 + b2 = c2 gives me:Also, this hyperbola's foci and vertices are to the left and right of the center, on a horizontal line paralleling the x -axis. From the equation, clearly the center is at (h, k) = (−3, 2). Since the vertices are a = 4 units to either side, then they are at the points (−7, 2) and at (1, 2). The equation a2 + b2 = c2 gives me:Purplemath What are exponents (in math)? Exponents, also called powers or orders, are shorthand for repeated multiplication of the same thing by itself. For instance, the shorthand for multiplying three copies of the number 5 is shown on the right-hand side of the "equals" sign in (5)(5)(5) = 5 3.Then the GCF is 2 × 3 × 5 × 7 = 210. On the other hand, the Least Common Multiple, the LCM, is the smallest (that is, the "least") number that both 2940 and 3150 will divide into. That is, it is the smallest number that contains both 2940 and 3150 as factors, the smallest number that is a *multiple* that is common to both these values. Therefore, it will be the … The Distance Formula is a variant of the Pythagorean Theorem that you used back in geometry. The Pythagorean Theorem allows you to relate the three sides of a right triangle; in particular, it allows you to find the length of the third side of a right triangle, given the lengths of the other two sides. The Distance Formula takes two points and ... Pre-algebra and algebra lessons, from negative numbers through pre-calculus. Grouped by level of study. Lessons are practical in nature informal in tone, and contain many worked examples and warnings about problem areas and probable "trick" questions.Also, this hyperbola's foci and vertices are to the left and right of the center, on a horizontal line paralleling the x -axis. From the equation, clearly the center is at (h, k) = (−3, 2). Since the vertices are a = 4 units to either side, then they are at the points (−7, 2) and at (1, 2). The equation a2 + b2 = c2 gives me: Pre-algebra and algebra lessons, from negative numbers through pre-calculus. Grouped by level of study. Lessons are practical in nature informal in tone, and contain many worked examples and warnings about problem areas and probable "trick" questions. Purplemath. On the previous page, we examined how the sine and cosine ratios for right triangles can be expanded, via the unit circle, to being full-fledged graphable functions. The next trigonometric ratio we'll consider is the tangent ratio. But the tangent's values are difficult to display on the unit circle. Purplemath What is a fraction? A fraction is a ratio of two whole numbers, such as ¾. The number on top is called the numerator; the number underneath is called the denominator. The word numerator is derived from a Latin word meaning "counter"; the word denominator is derived from a Latin word meaning "name". 1 foot : 12 inches. 2.54 centimeters : 1 inch. 100 centimeters : 1 meter. I could have chosen other conversion factors, if I'd felt like it. But these factors provide connections, one way or another, between "seconds" and "hours" and between "miles" and "meters", so they'll get the job done. Content Continues Below.The first solution is 45° more than a multiple of 180°, so (180n)° + 45° should do. The second solution is 30° more than a multiple of 180° and (because of the "plus / minus") also 30° less than that same multiple, so (180n)° ± 30° will cover this part. x = (180n)° ± 30°, (180n)° + 45° for all integers n.Purplemath Base 4. In base four, each digit in a number represents the number of copies of that power of four. That is, the first digit tells you how many ones you have; the second tells you how many fours you have; the third tells you how many sixteens (that is, how many four-times-fours) you have; the fourth tells you how many sixty …We can multiply the binomials like this: ( x + p) ( x + q) x2 + p x + q x + pq. x2 + (p + q) x + pq. In the above, (p + q) = b and pq = c from x2 + bx + c. This multiplication and simplification demonstrates why, to factor a quadratic, we'll need to start by finding the two numbers (being the p and the q above) that add up to equal b, …Also, this hyperbola's foci and vertices are to the left and right of the center, on a horizontal line paralleling the x -axis. From the equation, clearly the center is at (h, k) = (−3, 2). Since the vertices are a = 4 units to either side, then they are at the points (−7, 2) and at (1, 2). The equation a2 + b2 = c2 gives me:Purplemath. There is one special case for factoring that you may or may not need, depending upon how your book is structured and how your instructor intends to teach factoring quadratics. I call it "factoring in pairs", but your book may refer to it as "factoring by grouping". By whatever name, this technique is sometimes useful, but mostly it ...The intercepts at x = −7 and at x = −3 are clear. The intercept at x = 1 is clearly repeated, because of how the curve bounces off the x-axis at this point, and goes back the way it came.. Note: This polynomial's graph is so steep in places that it sometimes disappeared in my graphing software. I had to fiddle with the axis values and window size to get the …Purplemath. The first type of logarithmic equation has two logs, each having the same base, which have been set equal to each other. We solve this sort of equation by setting the insides (that is, setting the "arguments") of the logarithmic expressions equal to each other. For example: Solve log 2 (x) = log 2 (14).Purplemath. An arithmetic series is the sum of the terms of an arithmetic sequence. A geometric series is the sum of the terms of a geometric sequence. There are other types of series, but you're unlikely to work with them much until you're in calculus. For now, you'll probably mostly work with these two. This page explains and illustrates …Purplemath. You have learned various rules for manipulating and simplifying expressions with exponents, such as the rule that says that x 3 × x 5 equals x 8 because you can add the exponents. There are similar rules for logarithms. (I'll provide proofs for each of the rules. You almost certainly don't need to know …Classify the following equations according to the type of conic each represents: A) 3 x2 + 3 y2 − 6 x + 9 y − 14 = 0. B) 6 x2 + 12 x − y + 15 = 0. C) x2 + 2 y2 + 4 x + 2 y − 27 = 0. D) x2 − y2 + 3 x − 2 y − 43 = 0. A) Both variables are squared, and both squared terms are multiplied by the same number, so this is a circle. Pre-algebra and algebra lessons, from negative numbers through pre-calculus. Grouped by level of study. Lessons are practical in nature informal in tone, and contain many worked examples and warnings about problem areas and probable "trick" questions. The Purplemath lessons try not to assume any fixed ordering of topics, so that any student, regardless of the textbook being, may benefit. While the structure of the Purplemath lessons lends itself to many topical orderings, the following is one possible lesson sequence. To do your self-study, follow this sequence by working down the left-hand ...3,000 + x. 0.075. 1. The total interest earned will be the sum of the interest from each of the two investments, so add down the I column to get the following equation: 150 + 0.09 x = (3,000 + x ) (0.075) To find the solution, solve for the value of x. Advertisement.The take-aways from this page are the following rules for adding and subtracting with negative numbers: If you're adding two negative numbers, then add in the usual way, remembering to put a "minus" sign on the result. Example: −2 + (−3) = −5. If you're adding a positive number and a negative number, subtract the smaller number (that is ... Purplemath What are exponents (in math)? Exponents, also called powers or orders, are shorthand for repeated multiplication of the same thing by itself. For instance, the shorthand for multiplying three copies of the number 5 is shown on the right-hand side of the "equals" sign in (5)(5)(5) = 5 3. Purplemath. In the previous two pages, we've looked at solving one-step linear equations; that is, equations that require one addition or subtraction, or that require one multiplication or division. However, most linear equations require more than one step in order to find their solution. What steps then should be used, and in what order?Polynomial are sums (and differences) of polynomial "terms". For an expression to be a polynomial term, any variables in the expression must have whole-number powers (or else the "understood" power of 1, as in x1, which is normally written as x ). A plain number can also be a polynomial term. In particular, for an expression to be a polynomial ...Purplemath. Straight-line equations, or "linear" equations, graph as straight lines, and have simple variable expressions with no exponents on them. If you see an equation with only x and y − as opposed to, say x 2 or sqrt(y) − then you're dealing with a straight-line equation.. There are different types of "standard" formats for …Polynomial are sums (and differences) of polynomial "terms". For an expression to be a polynomial term, any variables in the expression must have whole-number powers (or else the "understood" power of 1, as in x1, which is normally written as x ). A plain number can also be a polynomial term. In particular, for an expression to be a polynomial ...Compound (or compounded) interest is interest that is earned on interest. If you invest $300 in a compound-interest fund for two years at 10% interest annually, you will earn $30 for the first year, but then you will earn 10% of $330 (or $33) for the second year, for a total of $63 in interest. Content Continues Below.Purplemath. Most exponential equations do not solve neatly; there will be no way to convert the bases to being the same, such as the conversion of 4 and 8 into powers of 2. In solving these more-complicated equations, you will have to use logarithms.Purplemath offers free algebra lessons, homework guidelines, and study skills survey for students of all levels and ages. Learn how to prepare for tests, avoid common mistakes, …Purplemath. Up until now, you've been told that you can't take the square root of a negative number. That's because you had no numbers which were negative after you'd squared them — so you couldn't "go backwards" and return to them by taking the square root. Before now, every number was positive after you squared it.Learn how to find real-number solutions and factors of polynomials using synthetic division, rational roots test, and quadratic formula. See detailed steps and graphs for each …To fix this "it depends on how you look at it" issue, mathematicians codified an ordering to the arithmetical operations of addition, subtraction, multiplication, division, repeated multiplication (that is, exponentiation), and grouping (that is, parentheticals). This codification of which comes before what is called "the order of operations". The Purplemath lessons have been written so that they may be studied in whatever manner the student finds most useful. Different textbooks cover different topics in different orders. The Purplemath lessons try not to assume any fixed ordering of topics, so that any student, regardless of the textbook being, may benefit. To set up and solve number word problems, it is important clearly to label variables and expressions, using your translation skills to convert the words into algebra. The process of clear labelling will often end up doing nearly all of the work for you. Number word problems are usually fairly contrived, but they're also fairly standard.Trigonometric Identities. Unit Circle. Find a clear explanation of your topic in this index of lessons, or enter your keywords in the Search box. Free algebra help is here! Now I can solve each factor by setting each one equal to zero and solving the resulting linear equations: x + 2 = 0 or x + 3 = 0. x = −2 or x = − 3. These two values are the solution to the original quadratic equation. So my answer is: x = −3, −2. Purplemath What is engineering notation? Engineering notation is similar to scientific notation, in that numbers are converted to (a number) times (10 raised to some power). But the powers in engineering notation will always be multiples of 3.. Because the powers are always multiples of three, the resulting numbers … Purplemath. So far, we've dealt with each type of asymptote separately, giving one page to each type, kind of like your textbook probably does, giving one section to each type. But on the test, the questions won't specify which type of asymptote you'll need to find. can be written as 0.538461538461…. These two fractions are repeating decimals. In the first case, the repeated block is just 3; in the second case, the repeated block is 538461.. On the other hand, we have loads of other numbers whose decimal forms are non-repeating, non-terminating decimals; these number are non-rational (that is, they cannot be written as …The foci are side by side, so this hyperbola's branches are side by side, and the center, foci, and vertices lie on a line paralleling the x -axis. So the y part of the equation will be subtracted and the a2 will go with the x part of the equation. The center is midway between the two foci, so the center must be at (h, k) = (−1, 0).Purplemath What are a number's "factors"? "Factors" are the whole numbers you multiply to get another whole number. For instance, factors of 15 are 3 and 5, because 3 × 5 = 15. Some numbers have more than one factorization (more than one way of being factored). For instance, 12 can be factored as 1 ×12, 2 × 6, and also …Purplemath. Variation problems aren't hard once you get the hang of the lingo. The only real difficulty is learning the somewhat specialized vocabulary and the techniques for this classification of problems. Variation problems involve fairly simple relationships or formulas, involving one variable being equal to one term.Share your videos with friends, family, and the world Purplemath. A ratio is one thing or value compared with or related to another thing or value; it is just a statement or an expression, and can only perhaps be simplified or reduced. On the other hand, a proportion is two ratios which have been set equal to each other; a proportion is an equation that can be solved. Note this common technique: In the "n = k + 1" step, it is usually a good first step to write out the whole formula in terms of k + 1, and then break off the "n = k", so you can replace it with whatever assumption you made about n = k in the assumption step.Then you manipulate and simplify, and try to rearrange things to get the RHS … You should know the formula for the circumference C and area A of a circle, given the radius r: Acir = π r2. Ccir = 2π r. (" π " is the number approximated by 3.14159 or the fraction 22/7) Remember that the radius of a circle is the distance from the center to the outside of a circle. In other words, the radius is just halfway across. Classify the following equations according to the type of conic each represents: A) 3 x2 + 3 y2 − 6 x + 9 y − 14 = 0. B) 6 x2 + 12 x − y + 15 = 0. C) x2 + 2 y2 + 4 x + 2 y − 27 = 0. D) x2 − y2 + 3 x − 2 y − 43 = 0. A) Both variables are squared, and both squared terms are multiplied by the same number, so this is a circle. Purplemath. So far, we've dealt with each type of asymptote separately, giving one page to each type, kind of like your textbook probably does, giving one section to each type. But on the test, the questions won't specify which type of asymptote you'll need to find. Purplemath. Since you always do exactly the same procedure each time you find the vertex form, the procedure can be done symbolically (using the algebraic quadratic y = ax 2 + bx + c explicitly, instead of putting in numbers), so you end up with a formula that you can use instead of doing the completing-the-square process each time.. …To find the slant asymptote, do the long division of the numerator by the denominator. The result will be a degree- 2 polynomial part (across the top of the long division) and a proper fractional part (formed by dividing the remainder by the denominattor). The linear polynomial, when set equal to y, is the slant asymptote. Classify the following equations according to the type of conic each represents: A) 3 x2 + 3 y2 − 6 x + 9 y − 14 = 0. B) 6 x2 + 12 x − y + 15 = 0. C) x2 + 2 y2 + 4 x + 2 y − 27 = 0. D) x2 − y2 + 3 x − 2 y − 43 = 0. A) Both variables are squared, and both squared terms are multiplied by the same number, so this is a circle. Purplemath. A "radical" equation is an equation in which at least one variable expression is stuck inside a radical, usually a square root. For most of this lesson, we'll be working with square roots. For instance, this is a radical equation, because the variable is inside the square root: \small { \sqrt {x\,} + 2 = 6 } x +2=6.Purplemath. The "addition" method of solving systems of linear equations is also called the "elimination" method. Under either name, this method is similar to the method you probably used when you were first learning how to solve one-variable linear equations. Suppose, back in the day, they'd given you the equation " x + 6 = 11 ".The Purplemath lessons try not to assume any fixed ordering of topics, so that any student, regardless of the textbook being, may benefit. While the structure of the Purplemath lessons lends itself to many topical orderings, the following is one possible lesson sequence. To do your self-study, follow this sequence by working down the left-hand ...The general form of a parabola's equation is the quadratic that you're used to: y = ax2 + bx + c. — unless the quadratic is sideways, in which case the equation will look something like this: x = ay2 + by + c. The important difference in the two equations is in which variable is squared: for regular (that is, for vertical) parabolas, the x ...Purplemath. When you work with angles in all four quadrants, the trig ratios for those angles are computed in terms of the values of x, y, and r, where r is the radius of the circle that corresponds to the hypotenuse of the right triangle for your angle. In the drawing below, the angle ends in the second quadrant, as indicated by the …To multiply a matrix by a scalar, multiply each entry of the matrix by the scalar's value. For instance, given a matrix M and the scalar −1, the scalar product −1M will multiply each entry in M by −1, so each entry in −1M will have the opposite sign of each entry in the original matrix M.For the three-sevenths fraction, the denominator needed a factor of 5, so I multiplied by \frac {5} {5} 55, which is just 1. We can use this same technique to rationalize radical denominators. I could take a 3 out of the denominator of my radical fraction if I had two factors of 3 inside the radical.. 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