Evaluate the improper integral or state that it is divergent. upper  ∞ ∫ bottom 1 9/ (1+x^2)...

Consider the defnite integral 0to1 ∫ dx/x^p (1) Is this an improper integral for all values...

Consider the defnite integral 0to1 ∫ dx/x^p (1) Is this an improper integral for all values of p? Justify your answer. (2) Find all the values of p for which this integral exists and evaluate the integral for those values of p.

Evaluate Integral of ((cosh x) / (9-sinh^2(x))) dx Limits: a=ln7, b= ln9

Evaluate Integral of ((cosh x) / (9-sinh^2(x))) dx Limits: a=ln7, b= ln9

Evaluate the following indefinite integral: ∫x^2/√(16+x^2 )dx Evaluate the following indefinite integral: ∫xe^2x dx

Evaluate the following indefinite integral: ∫x^2/√(16+x^2 )dx Evaluate the following indefinite integral: ∫xe^2x dx

evaluate the indefinite integral (1+2x)/(1+x^2) dx

evaluate the indefinite integral (1+2x)/(1+x^2) dx

Evaluate the integral: ∫8x^2 / √9−x^2 dx (A) Which trig substitution is correct for this integral?...

Evaluate the integral: ∫8x^2 / √9−x^2 dx (A) Which trig substitution is correct for this integral? x=9sec(θ) x=3tan(θ) x=9tan(θ) x=3sin(θ) x=3sec(θ) x=9sin(θ) (B) Which integral do you obtain after substituting for x and simplifying? Note: to enter θθ, type the word theta. (C) What is the value of the above integral in terms of θ?    (D) What is the value of the original integral in terms of x?   

Evaluate integral 1/1+x^9 dx as a power series. Give the interval of convergence of the power...

Evaluate integral 1/1+x^9 dx as a power series. Give the interval of convergence of the power series.

1. y=∫upper bound is sqrt(x) lower bound is 1, cos(2t)/t^9 dt using the appropriate form of...

1. y=∫upper bound is sqrt(x) lower bound is 1, cos(2t)/t^9 dt using the appropriate form of the Fundamental Theorem of Calculus. y′ = 2. Use part I of the Fundamental Theorem of Calculus to find the derivative of F(x)=∫upper bound is 5 lower bound is x, tan(t^4)dt F′(x) = 3. If h(x)=∫upper bound is 3/x and lower bound is 2, 9arctan t dt , then h′(x)= 4. Consider the function f(x) = {x if x<1, 1/x if x is >_...

1a) Evaluate the limit as x goes to infinity using l'hopitals rule (x^-1/3)/sin(1/x) 1b) Evaluate the...

1a) Evaluate the limit as x goes to infinity using l'hopitals rule (x^-1/3)/sin(1/x) 1b) Evaluate the improper integral (if convergent find it's value) (secx-tanx)dx where a= 0 and b=pi/2

Evaluate the integral from -1 to 2 for (6x + 10 |x| ) dx

Evaluate the integral from -1 to 2 for (6x + 10 |x| ) dx

Evaluate double integral Z 2 0 Z 1 y/2 cos(x^2 )dx dy (integral from 0 to...

Evaluate double integral Z 2 0 Z 1 y/2 cos(x^2 )dx dy (integral from 0 to 2)(integral from y/2 to 1) for cos(x^2) dx dy