Use the Fundamental Theorem of Calculus to evaluate the following definite integral. 2 6 dx S...
Use the Fundamental Theorem of Calculus to evaluate the following definite integral. 1 2 3 dx 1 2 3 dx √1-x² (Type an exact answer.) S 11
Use the Fundamental Theorem of Calculus to evaluate the following definite integral. 2. 3 dx 2 (Type an exact answer.)
Use the Fundamental Theorem of Calculus to evaluate the following definite integral. 2 S (5x2 +7) dx -3 2 S (5x2 +7) dx = -3 (Type an exact answer.)
Use the Fundamental Theorem of Calculus to evaluate the following definite integral. 2 3 dt t 1 2 dt = t 1 (Type an exact answer.)
help please Evaluate the definite integral using the Fundamental Theorem of Calculus. (1+ (1 + 14х5) dx Use The Fundamental Theorem of Calculus and the antiderivative found in Step 2 to evaluate the definite integral. fo* (2 + 14x5) dx = = (x+3x0916 (1+](O* )-( O*+O) “) 10 3
Use the Fundamental Theorem to evaluate the definite integral exactly. ſ (18x? +7) dx Enter the exact answer. ſ (18x? + 7) dx =
Evaluate the given definite integral using the fundamental theorem of calculus. 2 x2 18) (x + 1)3 dx ) 77 77 77 A) 77 972 B) 972 D) 324 324
Use the Second Fundamental Theorem Of Calculus To Evaluate The Integral 3 3 J 1 sec-Y T/2 sin 2m dx cos x 3 3 J 1 sec-Y T/2 sin 2m dx cos x
Use a change of variables to evaluate the following definite integral. 0 S xV81-x* dx -3 Determine a change of variables from x to u. Choose the correct answer below. O A. u=x4 O B. u = 81- x4 O C. u = 4x3 OD. u= 181 - x4 Write the integral in terms of u. S xV81-x* dx= du -3 Evaluate the integral. 0 5 x 181-x* dx= { -3 (Type an exact answer.)
please help with number 15 15. Given the following definite integral, lo x + x dx a. Evaluate the integral using limits, showing all steps: b. Confirm your result by using the rules of integration and the Fundamental Theorem of Calculus: TUUKU U uit alta vi tile region bounded by the following equations (Note that this is an "area between functions" question, and not a question of finding the definite integral): y = 5x - 1 y = 0 x...