Let I=∫π/30tan6(x)sec(x)dx.I=∫0π/3tan6(x)sec(x)dx. Express the value of ∫π/30tan8(x)sec(x)dx in terms of I.

A) let f(x)=4x^(4x) find f'(3) f'(3)= B) let y=x^(logbase6(x)) dy/dx=??? must express answer ini terms of...

A) let f(x)=4x^(4x) find f'(3) f'(3)= B) let y=x^(logbase6(x)) dy/dx=??? must express answer ini terms of ln or log

Express the function f(x)= (1 if 0⩽x<π, sin2x π⩽x<2π and e^−x x⩾2π) . In terms of...

Express the function f(x)= (1 if 0⩽x<π, sin2x π⩽x<2π and e^−x x⩾2π) . In terms of the unit step functions.

lim[x→π/2]7cos(7x)sec(5x),what's the answer? how can i solve it?

lim[x→π/2]7cos(7x)sec(5x),what's the answer? how can i solve it?

Let f(x) = sin(x) on the interval I = [0,π]. Also, let n = 10. a.)...

Let f(x) = sin(x) on the interval I = [0,π]. Also, let n = 10. a.) Setting this problem up for a midpoint Riemann sum, determine ∆x and a formula for x∗k for the interval I and n given above:

express the solution of the given initail value problem in terms of an integral defined function...

express the solution of the given initail value problem in terms of an integral defined function x^2dy/dx - y = x^3 y(1)=0

Solve the following initial value problem, dy/dx = 8cos(x) / (y2 + 4y + 4) y(π/4)...

Solve the following initial value problem, dy/dx = 8cos(x) / (y2 + 4y + 4) y(π/4) = 4

Let D={ (x,y) : x2+y2 ≤ 4x+5 and y≥ 0 } . Express the double integral...

Let D={ (x,y) : x2+y2 ≤ 4x+5 and y≥ 0 } . Express the double integral I = f(x, y) dA D as an iterated integral. I = f(x, y) dx dy=?

Find the exact length of the curve. y = ln(sec x), 0 ≤ x ≤ π/3

Find the exact length of the curve. y = ln(sec x), 0 ≤ x ≤ π/3

9.3.2 Problem. Let R be a ring and I an ideal of R. Let π :...

9.3.2 Problem. Let R be a ring and I an ideal of R. Let π : R→R/I be the natural projection. Let J be an ideal of R. Show that π−1(π(J)) = (I, J). Show that if J is a maximal ideal of R with, I not ⊆ J, then π (J) = R/I. Suppose that J is an ideal of R with I ⊆ J. Show that J is a maximal ideal of R if and only if π(J)...

Solve the initial value problems. 1) x (dy/dx)+ 2y = −sinx/x , y(π) = 0. 2)...

Solve the initial value problems. 1) x (dy/dx)+ 2y = −sinx/x , y(π) = 0. 2) 3y”−y=0 , y(0)=0,y’(0)=1.Use the power series method for this one . And then solve it using the characteristic method Note that 3y” refers to it being second order differential and y’ first