Differentiate the function with respect to x y=1/4.x4 + 1/3.73 +1/2.62
Differentiate x4/y8 with respect to x, assuming that y is implicitly a function of x. (Use symbolic notation and fractions where needed. Use y' in place of dy/dx)
Question 4 a) Differentiate with respect to x, i. y = sin 2x ii. y = x In(5x + 2) b) Show that if y = cotx, dy dx -cosec? x c) Show that if y = tan x, then dy dx 1 1+xal Question 5 Use calculus to find any turning points of the function A(t) = te-020 and determine their nature (maximum, minimum or inflexion) using any method. Question 6 a) Find tan” x dx b) Use integration...
Now, differentiate f '(x) = 1 4 cos x 4 with respect to x. f ''(x) =
Differentiate f(x) = 24 – 4.x +3 3+1 (1) f'(x) = [(x4–4x+3)/(277)]-(Vx+1)(42.3 – 4) (V<+1) z(1+1) [E{7)/(E+11–22)=(1-21)(1+34) = (x),f (1) z(I+) EN/1)-(t-rat) = (x), (£) (1-x)g = (2x),f ()
Step 1 Differentiate f(x) = -5x2 + 20x + 4 with respect to x. f'(x) = Submit Skip_(you cannot come back)
cal Economics W 20 Asha Sadanand Assignment 9A Graded Differentiate the following function with respect to X: F(X,Y)= (-4 x2 + x + 7) (8Y2 - 4Y+7)
Question 1 The graph of x4 - y = 1 is not symmetric with respect to which of the following graph? o Origin V-axis X-axis O y = x O Question 2 Determine if f(x)= 4x3 - 2x is even, odd, or neither? Insufficient Information Neither Even Odd Question 3 Given that f(x) is one-to-one, and f(1) = 2. f(2)=5. f(5)= 0, and f(0) = 1. Determine (f-lof-1)(0). 5 O 0 2 1
QUESTION 1 [4] Differentiate the following function using first principles: f(x)=*+1 QUESTION 2 [6] Differentiate the following: 2.1 y = e-1 [1] 2.2 y = xê [1] 2.3 y = tx (1) 2.4 y = 2e* (1) 2.5 y = 2x2 – 3x3 [2]
Differentiate the function ??(??) = ??4 ln(5??) + ln ( 3??+2 2??−3 ) 3x+2 Differentiate the function f(x) = x4 ln(5x) + In 2x-3 For full credit show each step. You do not need to simplify the answer. (10 points)
Let Y=1/X, for random variable X. X has the density function fx(x) = 3/x4 for 1<x<infinity. What is the density function of Y? Show your work. State the support of Y.