Evaluate the integral of (x²lnx) with respect to x

Find the volume of the solid generated by revolving the region bounded by y=sqrt(x), x=4, and the x-axis about the x-axis.

Find two numbers whose sum is 30 and whose product is as large as possible.

Find the Cartesian equation of the line given by the parametric equations x=t/3 and y=2t-t²

Express the repeating decimal as a geometric series and find the sum: 0.343434......

Use Eulerś Method with delta x=0.1 to find y when x=1.3 for dy/dx = y+x given y=2 when x=1.

What is the derivative of y=x^x ?

Find the surface area of the solid formed by the region bounded by x=y², x=4, and the x-axis rotated around the x-axis.

If r(x)=9x, c(x)=x³-6x²+15x, and x is units sold, what value of x will maximize profit?

Find the second derivative of the line given by the parametric equations x=ln|5t²| and y=2t³/3

Given 1/(1-x) = 1 + x + x² + x³ + ...... + xⁿ + ..... use integration to find a power series to represent ln|1-x|

Evaluate dy/dx = -x/ye^x² given initial condition (0,1)

Evaluate the integral of sin²xcos³x with respect to x

Evaluate the integral, from -infinity to infinity, of 1/(1+x²) w.r.t. x.

A police cruiser is approaching a right-angled intersection from the south and is chasing a car that has turned the corner and is moving east. When the cruiser is 0.5 mi south of the intersection and the car is 1.2 mi east of it, a radar determines the distance between them is increasing at 20mph. If the cruiser is moving at 65mph at the instant of measurement, what is the speed of the car?

Find the area of the region enclosed by r=3(1+cos(theta))

Does the sum, from n=0 to infinity, of (2ⁿ+5)/3ⁿ converge?

A cake is cooling so it can be frosted. The cake must be cooled below 80^oF before it can be frosted. The temperature in the bakery is at a constant 60^oF. When the cakeś temperature is checked, it is at 100^oF. 10 minutes later, it has dropped to 90^oF. How much longer will it take for the cake to reach below 80^oF?