We need at least 9 more requests to produce the answer.
1 / 10 have requested this problem solution
The more requests, the faster the answer.
Calculate the definite integral. 4 dx
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 =
Question 10 Set up the definite integral and evaluate the definite integral to determine the area of the shaded region. Show all work and provide your response in the box below. The curve is given by f(x)= x3 + 2x2 - 5x+3. If you cannot view the image below, please click on this link. HHHHHH HHHHHHH 5+ HH HHHHH HHH -7 -6 -5 -4 -3 -2 -1 0
11. (+12)In Problems 11a - 11f, calculate the definite integral by referring to the figure with the indicated areas. Area A = 1,259 Area B = 2,331 Area C = 3,196 Area D = 1,779 11a. Sºf(x) dx 110. Søf(x) dx 11e. S f(x) dx 11b. Sº f(x) dx 11d. Sf(x) dx 11f. Sºf(x) dx
b Area A = 1,314 Calculate the definite integral (rix) dx by referring to the figure on the right with the indicated areas. Area B = 2,436 Area C = 3,062 b d X a В Area D = 1,756 b (fix) dx =D d (Simplify your answer.)
Calculate the definite integral by referring to the figure with the indicated areas. 0 b d f(x)dx a B. с Area A= 1.387 Area C= 5.657 Area D = 1.736 Area B = 2.272 0 f(x)dx= с
3. Sketch the region enclosed by the given curves and use a definite integral to calculate its exact area. y = 0,x=-1, y = 772 , x = 1
For each indefinite integral, evaluate the integral. For each
definite
integral, evaluate the integral or show that it is
divergent.
******Please try not to use U-sub, I do not understand how the
online step by step calculators solve using
4. a and b
8+2x2 r(arctan(x))dx
8+2x2 r(arctan(x))dx
8. Write down a definite integral (but do not evaluate) that produces the following limit of sums using the definition of definite integral: b) lim 61 k-l
8. Write down a definite integral (but do not evaluate) that produces the following limit of sums using the definition of definite integral: b) lim 61 k-l
Calculate the definite integral by referring to the figure with the indicated areas, 0 f(x)dx Area A = 1.565 Area B = 2.469 Area C = 5.421 Area D = 1.711 f(x)dx= 0) 6 of 32 (1 complete)