Find the antiderivative for each function when C equals 0. Check your answers by differentiation. 2 (a) h(x) = 3x - 1 3 2 - 4 dy+, - 3 3 (c) k(x) = X (b) g(x) = 3x (a) H(x) = (b) G(x) = (c) K(x) =

find integral of curves dx/(x + y) = dy/(x + y) = dz/−(x + y + 2z)

Consider the integral X -dx with n = 4. a. Find the trapezoid rule approximations to the integral using n and 2n subintervals. b. Find the Simpson's rule approximation to the integral using 2n subintervals. c. Compute the absolute errors in the trapezoid rule and Simpson's rule with 2n subintervals. a. What is the trapezoid approximation with n subintervals? T(4)=(Round to six decimal places as needed.) What is the trapezoid approximation with 2n subintervals? T(8) = (Round to six decimal places as needed.) b. What is the Simpson's rule approximation with 2n subintervals? S(8)=(Round to six decimal places as needed.) c. What is the error in the trapezoid rule approximation with 2n subintervals? (Round to six decimal places as needed.) What is the error in the Simpson's rule approximation with 2n subintervals? (Round to six decimal places as needed.)

00 fe Suppose that the probability that a particular computer chip fails after t = a hours of operation is 0.00004 0.00004 dt. a a. Find the probability that the computer chip fails after 16.000 hr of operation (that is, the chip lasts at least 16,000 hr). b. Of the chips that are still in operation after 16,000 hr, what fraction of these will operate for at least another 16,000 hr? c. Evaluate 0.00004 Se -0.000041 dt and interpret its meaning. a. The probability that the chip fails after 16,000 hr of operation is (Round to three decimal places as needed.) b. The fraction that will still be operating for at least another 16.000 hr is (Round to three decimal places as needed.) c. Choose the correct answer below. OA. The probability that the chip never fails is 0.00004 -0.00004t dt= OB. The probability that the chip eventually fails is 0.00004 S 0.00004 dt = dt= -0.000041 dt= OC. The probability that the chip fails immediately is 0.00004 OD. There is not enough information to interpret…

Find the volume of the described solid of revolution or state that it does not exist. The region bounded by f(x) = (x-5) and the x-axis on the interval (5,7] is revolved about the x-axis. Find the volume or state that it does not exist. Select the correct answer and, if necessary, fill in the box to complete your choice. OA. The volume is cubic units. (Type an exact answer.) OB. The volume does not exist.

Use the reduction formulas in a table of integrals to evaluate Sx³e 3 18x dx. Click here to view basic integrals. Click here to view trigonometric integrals. Click here to view √x³e 18x dx = ☐

Evaluate the following integral using trigonometric substitution. 2√√3 x² √16-x - dx What substitution will be the most helpful for evaluating this integral? A. x=4 sec 0 OB. x=4 sin 0 OC. x=4 tan 0 Rewrite the given integral using this substitution. 2√√3 X 2 dx= de 0 √16-x (Type exact answers.) Evaluate the integral. 2√3 0 2 x² √16-x 2 dx = (Type an exact answer.)

Use the following three identities to evaluate sin sx cos tx = sin sx sin tx = COS Sx cos tx = 1 S sin (s+t)x + sin (s-t)x] sin 14x cos 11x dx. [cos (s+t)x- cos (s-t)x] 2[cos (s+t)x + cos(s-t)x] S sin 14x cos 11x dx = ☐

Evaluate the following integral. [11 2x 2x sin 11 sin x cos x dx √11 sin 11 sin 2x cos 2x dx = ☐