Chapter 5, Section 5.3, Question 045 Evaluate the integral using an appropriate substitution. Enter the exact...
Chapter 5, Review Exercises, Question 013 x Evaluate the integral ✓ dx by making the substitution u = x - 6. (1x2 - 6x4 - 12x2 Enter the exact answer. Ir-ore- dx = ? Edit +C (x2 - 6V4 – 12x2
Chapter 7, Section 7.8, Question 009 x Incorrect. Evaluate the integral if it converges. Enter the exact answer, or enter na if it diverges. Edit 1-oo (5x - 63 SHOW HINT
Use cylindrical or spherical coordinates to evaluate the integral: inment FULL SCREEN PRINTER Chapter 14, Section 14.6, Question 019 Use cylindrical or spherical coordinates to evaluate the integral. V64-y2 V128-22 Voor z dz dx dy Enter the exact answer. 128-22-yy 22 dz dx dy = Edit SHOW HINT LINK TO TEXT
Use substitution to evaluate the definite integral given below. -- tan* (3*) sec* (33°) de (Enter an exact answer.) Provide your answer below: S. - x tan* (3x)secº ( 3x?) ck=
Chapter 15, Section 15.2, Question 045 Find the work done by the force field F on a particle that moves along the curve C. F(x,y) = 2xy i + 2x j C: x= y2 from (0,0) to (8,2) Enter the exact answer as an improper fraction, if necessary. W= ? Edit
Decide on what substitution to use, and then evaluate the given integral using a substitution. HINT See the FAQ a the end of the section for advice on deciding on u, and the examples for the mechanics of doing the substitution.] (4 10.2e344 dx +3.000024034x-4x + Decide on what substitution to use, and then evaluate the given integral using a substitution. HINT See the FAQ a the end of the section for advice on deciding on u, and the examples...
Evaluate the definite integral two ways: first by a V -substitution in the definite integral and then by a V -substitution in the corresponding indefinite integral. = Enter the exact answer. In2 Missing Plug-in J-In2 et + a dx =
Evaluate the following integral using trigonometric substitution. 7x² dx (121 + x2) 7x² dx s (121 +x?)? (Type an exact answer.)
Evaluate the following integral using trigonometric substitution. dx S 3 2 (1+x²) dx S 11 2 (Type an exact answer.)
Chapter 5, Section 5.3, Question 004 Find the area between y = x + 12 and y = 2x + 3 between x = 0 and x = 2. Enter the exact answer. Area =