Solve the problem. 15) Given the acceleration, initial velocity, and initial position of a body moving along a coordinate line at time t, find the body's position at time t. a = 18, v(0) = 3, s(0) = 15 15) A) s = 18t2 + 3t + 15 C) s = 9t2 + 3t = -9t2- s = 9t2 + 3t + 15 B) s - 3t + 15

Please answer 15 and 18-20. This has to be turned in by 11:59 pm tonight.

Thank you so much.

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Solve the problem. 15) Given the acceleration, initial velocity, and initial position of a body moving along a coordinate line at time t, find the body's position at time t. a = 18, v(0) = 3, s(0) = 15 A) s = 18t2 + 3t + 15 C) s = 9t2 + 3t 15) B) s = -9t2 - 3t + 15 D) s = 9t2 + 3t + 15 Use the substitution formula to evaluate the integral. 1 16) Vx +4 dx 16) B) V5 10 16 15 A) 55 - 8 D) 5- 4t 17) dt 17) (2+2)5 -1 65 65 65 A) - 65 В) 324 C) 1296 D)- 2592 - 2592 18) Use the Trapezoid Rule, with n = 4, to approximate 1 dx 18) (x-1)2 A) 0.5090 B) 0.5004 C) 2.5000 D) 1.7396 19) Use the Trapezoid Rule, with n= 4, to approximate (x2-7x) dx 19) A) 57.17 B) 53.59 С) -53.59 D) -57.17 20) Use the Trapezoid Rule, with n = 4, to approximate (x2 - 10x + 21) dx 20) A) -10.67 B) 10.00 C) 10.67 D) -10.00