Model the data using an exponential function f(x) = Abx. HINT [See Example 1.] x 0...

2. (a) Let a,b ≥0. Define the function f by f(x)=(a+b+x)/3-∛abx Determine if f has a...

2. (a) Let a,b ≥0. Define the function f by f(x)=(a+b+x)/3-∛abx Determine if f has a global minimum on [0,∞), and if it does, find the point at which the global minimum occurs. (b) Show that for every a,b,c≥0 we have (a+b+c)/3≥∛abc with equality holding if and only if a=b=c. (Hint: Use Part (a).)

Test the given data to see whether they are exponential. x 0 2 4 6 y...

Test the given data to see whether they are exponential. x 0 2 4 6 y 5000 1000 200 40 If they are exponential, find an exponential model. y = 6250 ✕ 0.78x y = 2500 ✕ 0.56x      y = 7500 ✕ 0.67x y = 5000 ✕ 0.45x

Use the shortcut rules to mentally calculate the derivative of the given function. HINT [See Examples...

Use the shortcut rules to mentally calculate the derivative of the given function. HINT [See Examples 1 and 2.] f(x) = 4x4 + 7x3 − 3 f '(x) = Use the shortcut rules to mentally calculate the derivative of the given function. HINT [See Examples 1 and 2.] f(x) = −x + (8/x) +1 f '(x) = Find the derivative of the function. HINT [See Examples 1 and 2.] f(x) = 8x3 − 4x2 + x f '(x) = Find...

Consider the function f(x)=xarctan(1/x) if x≠ 0 ,0 if x = 0. (1) Using the defnition...

Consider the function f(x)=xarctan(1/x) if x≠ 0 ,0 if x = 0. (1) Using the defnition of continuity at a point you studied in Calculus 1 check whether f(x) is continuous at x = 0. (2) Using the limit defnition of differentiability at a point check whether f'(0) exists.

Let X have exponential density f(x) = λe−λx if x > 0, f(x) = 0 otherwise...

Let X have exponential density f(x) = λe−λx if x > 0, f(x) = 0 otherwise (λ > 0). Compute the moment-generating function of X.

Problem 1: Find a non-zero function f so that f'(x) = 3f(x). The exponential function f(x)...

Problem 1: Find a non-zero function f so that f'(x) = 3f(x). The exponential function f(x) = e^x has the property that it is its own derivative. (d/dx) e^x = e^x f(x) = e^(3x) f '(x) = e^(3x) * (d/dx) 3x = e^(3x) * 3 = 3e^(3x) = 3 f(x) Problem 2: Let f be your function from Problem 1. Show that if g is another function satisfying g'(x) = 3g(x), then g(x) = A f(x) for some constant A????

Given the joint probability density function f ( x , y ) for 0 < x...

Given the joint probability density function f ( x , y ) for 0 < x < 3 and 0 < y < 2 x^2y/81 Find the conditional probability distribution of X=1 given that Y = 1 f ( x , y ) = x^2 y/ 81 . F i n d the conditional probability distribution of X=1 given that Y = 1. i . e . f (X ∣ y = 1 )( 1 )

:The exponential function f(x) = e x dominates any ”power of x” function as x increases...

:The exponential function f(x) = e x dominates any ”power of x” function as x increases to infinity. That is lim x k e x = 0 for every positive value k. Use the power series given below to verify this fact. e x = 1 + x + x 2 2! + x 3 3! + x 4 4! + x 5 5! + ...

The probability density function of X is given by f(x)={a+bx0if 0<x<1otherwise If E(X)=1.5, find a+b. Hint:...

The probability density function of X is given by f(x)={a+bx0if 0<x<1otherwise If E(X)=1.5, find a+b. Hint: For a probability density function f(x), we have ∫∞−∞f(x)dx=1

Im stuck on this problem thank you! Suppose F is an exponential function where f(-1) =...

Im stuck on this problem thank you! Suppose F is an exponential function where f(-1) = 5 and f(1) = 3.2 1. What is the 2-unit growth factor for F? 2. What is the 1-unit growth factor for F? 3. What is the initial value of f? f(0) = 4. write a function formula for f. f(x) =