In this chapter, you will be able to
... 11) Asymptotes – The graph of f has at most one horizontal asymptote determined by comparing the degrees of p(x) and q(x) a) If the rational function is proper then y = 0 (the x-axis) is a horizontal asymptote. b) If the degree of p(x) and q(x) are equal, the graph of f has the line y = an/ bm as a ...
... 11) Asymptotes – The graph of f has at most one horizontal asymptote determined by comparing the degrees of p(x) and q(x) a) If the rational function is proper then y = 0 (the x-axis) is a horizontal asymptote. b) If the degree of p(x) and q(x) are equal, the graph of f has the line y = an/ bm as a ...
Complex Plane, DeMoivre’s Theorem ( 9.3 / 4e ( 11.3 / 3e ))
... Complex Numbers: Plot on the complex plane, and convert to & from polar format 1) Plot the each of the following complex numbers on the graph, clearly labeling which point corresponds to which complex number. Then convert each complex number to the polar form for a complex number. 1. 3 + 3i ...
... Complex Numbers: Plot on the complex plane, and convert to & from polar format 1) Plot the each of the following complex numbers on the graph, clearly labeling which point corresponds to which complex number. Then convert each complex number to the polar form for a complex number. 1. 3 + 3i ...
AS to A2 transition MATHS
... y 4 x3 5 x c) y 24 4 x 2 5. For the function f ( x) x3 3x 2 4 x 12 a) Find the value of f (1) , f (2) and f (3) , hence find a factor of f (x) b) Use your answer to a) to fully factorise the function f (x) c) Solve the equation f ( x) 0 6. Find the equation of the line that is p ...
... y 4 x3 5 x c) y 24 4 x 2 5. For the function f ( x) x3 3x 2 4 x 12 a) Find the value of f (1) , f (2) and f (3) , hence find a factor of f (x) b) Use your answer to a) to fully factorise the function f (x) c) Solve the equation f ( x) 0 6. Find the equation of the line that is p ...
Full text
... ^ sequence. When k- 2, the generalized order-/c Fibonacci sequence is reduced to the conventional Fibonacci sequence. Following the approach taken by Kalman [2], we define a k x k square matrix A as follows: ...
... ^ sequence. When k- 2, the generalized order-/c Fibonacci sequence is reduced to the conventional Fibonacci sequence. Following the approach taken by Kalman [2], we define a k x k square matrix A as follows: ...
Name
... Translating Verbal Situations Practice Translate each phrase into an expression, equation or inequality. 1) 12 times a number y. ...
... Translating Verbal Situations Practice Translate each phrase into an expression, equation or inequality. 1) 12 times a number y. ...
Computer Representation of Numbers and Computer
... there is no hope to store them exactly. On a computer, floating point convention is used to represent (approximations of) the real numbers. The design of computer systems requires in-depth knowledge about FP. Modern processors have special FP instructions, compilers must generate such FP instruction ...
... there is no hope to store them exactly. On a computer, floating point convention is used to represent (approximations of) the real numbers. The design of computer systems requires in-depth knowledge about FP. Modern processors have special FP instructions, compilers must generate such FP instruction ...
The Golden Rectangle and the Golden Ratio
... this sequence with this series: 1+1/1·1. The third element is 1+1/1·1-1/1·2. The fourth is 1+1/1·1-1/1·2+1/2·3, and so on. This series was known long before I discovered it. The golden ratio can be represented as the simplest continued fraction (as shown below). ...
... this sequence with this series: 1+1/1·1. The third element is 1+1/1·1-1/1·2. The fourth is 1+1/1·1-1/1·2+1/2·3, and so on. This series was known long before I discovered it. The golden ratio can be represented as the simplest continued fraction (as shown below). ...
Zero and Negative Exponents 10.4
... 17. ERROR ANALYSIS Describe and correct the error in evaluating the expression. ...
... 17. ERROR ANALYSIS Describe and correct the error in evaluating the expression. ...
Elementary mathematics
Elementary mathematics consists of mathematics topics frequently taught at the primary or secondary school levels. The most basic topics in elementary mathematics are arithmetic and geometry. Beginning in the last decades of the 20th century, there has been an increased emphasis on problem solving. Elementary mathematics is used in everyday life in such activities as making change, cooking, buying and selling stock, and gambling. It is also an essential first step on the path to understanding science.In secondary school, the main topics in elementary mathematics are algebra and trigonometry. Calculus, even though it is often taught to advanced secondary school students, is usually considered college level mathematics.