Four Function

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    English

    CHAPTER 7 CHAPTER 8 CHAPTER 9 : : : : : : : : : Functions Quadratic Equation Quadratic Function Simulataneous Equation Indices and Logartihms Coordinate Geometry Statistics Circular Measures Differentiation Solution of Triangles Index Number CHAPTER 10 : CHAPTER 11 : MATHS 2 3472/1 2012 Maths Catch Network © www.maths-catch.com [Lihat halaman sebelah] SULIT MATHS Catch SPM 2012 USAHA +DOA+TAWAKAL FOKUS A+ GEMPUR CHAPTER 1: Function Exam Year: ADDITIONAL MATHEMATICS FORM 4 / TINGKATAN

    Words: 7475 - Pages: 30

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    Iceland

    Consider the function f(x)=(e^2x-1)/x Find the limit of f(x) as x approaches zero. 2. Define the function Find the derivative of that function. Find f’(0.67) (the first derivative at 0.67). What does that mean for the function f at the point? Find f’’(0.67) (the second derivative at 0.67). What does it mean for the function f at that point? Find all points where the derivative is zero. A) B) C) D) 3. Define the function Find the derivative of the function and use

    Words: 290 - Pages: 2

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    Arpit Kothari

    ASSIGNMENT 2 QUESTION 1 a) Suppose the monthly revenue and cost functions (in dollars) for commodity produced and sold are: ( ) = 400 − and units of a ( ) = 5000 + 70 respectively. i) Find the profit function. Solution: [2 marks] Revenue function R(x) = 400 − 20 Cost function C(x) = 5000 + 70 Profit Function is defined as ( )= ( )− ( ) = 400 − ( ) = 330 − ii) − 5000 Find the marginal profit function. [2 marks] Solution: Marginal profit is the difference

    Words: 846 - Pages: 4

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    Math

    pairs for the function ( ) = 2 , as well as its graph. Inputs Outputs −2 −1 0 1 2 ( ) (−2) = 4 (−1) = 1 (0) = 0 (1) = 1 (2) = 4 Ordered Pairs (, ( )) (−2, 4) (−1, 1) (0, 0) (1, 1) (2, 4) I have plotted the ordered pairs above in the graph below. Function f 1 Example 1: Use the function on the previous page, its table, and its graph to answer the following: a. How can the function ( ) = 2 + 2 be written in terms of the function ? ( ) = (

    Words: 2324 - Pages: 10

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    Math

    that A and B are available for production are 40 and 34, respectively. The profit per unit on X, Y, and Z is $10, $15, and $22, respectively. 4. (a) Find the limit of [pic] and [pic]. (b) Find the first order derivative of the following functions. (i) y = ex+y, where y = y(x) and (ii) f(x) = [pic]. 5. Find an equation of the tangent line

    Words: 369 - Pages: 2

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    Rudin

    Math 5616H Midterm 1 with solutions Spring 2013 March 8, 2013 Total 80 points 1. (15 points) Let f (x) and g(x) be real continuous functions on an interval [a, b], such that b b f 2 (x) dx = a a b g 2 (x) dx = 1. Prove that a f (x)g(x) dx ≥ −1, and that a b f (x)g(x) dx = −1 if and only if f ≡ −g on [a, b]. Answer: Since f and g are continuous, so is (f + g)2 , which is therefore integrable. We compute: b b b b b 0≤ a b [f (x)+g(x)]2 dx = a f (x)2 dx+2 a

    Words: 966 - Pages: 4

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    Survey of Calculus Test 2

    coordinates of all relative extreme points of[pic]. |A)[pic] |B) [pic] |C) [pic] |D) [pic] |E) [pic] | [pic] First find the derivative of the function[pic], f ’(x): |[pic] |= |[pic] |apply power rule of differentiation | | |= |[pic] |simplify

    Words: 1643 - Pages: 7

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    W3Wsdasdjdlnmladadasldjna

    Polynomial functions mc-TY-polynomial-2009-1 Many common functions are polynomial functions. In this unit we describe polynomial functions and look at some of their properties. In order to master the techniques explained here it is vital that you undertake plenty of practice exercises so that they become second nature. After reading this text, and/or viewing the video tutorial on this topic, you should be able to: • recognise when a rule describes a polynomial function, and write down the degree

    Words: 2680 - Pages: 11

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    Point of Diminishing Return

    The total amount of revenue made by the Miramar Resort Hotel is given by the function , , where x is the amount of money the hotel spends on advertising its services, and where both revenue and x are measured in thousands. 1. Using Wolfram Alpha, graph the revenue function over the given domain and paste the graph here. 2. Compute the marginal revenue function R'x and copy and paste a graph of this function on the domain here. Then use Wolfram Alpha to determine where revenue is increasing

    Words: 415 - Pages: 2

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    Nothing

    Ariana Corney Aesa McComb Mina Haw Son Writing assignment #2 When g (0) it is zero because the slope is at zero When it is g (10) it is positive because of the area being colored on the graph. The area under the x-axis is negative, so when you add all of the areas it becomes positive. That brings us to the derivative of g (x), to help us find all of the x-values, which is equal to f(x). Same with the derivative of g (a), it equals f (a), but f (a) is equal to 0. The x values are 2,4,6,8, and

    Words: 352 - Pages: 2

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