Find the indefinite integral.

Solve the problem.Find the tangent line(s) at the pole for the curve 

A. ? = 0 (y = 0), ? =  [y = (tan)x], ? =  [y = (tan)x]
B. ? =  [y = (tan)x], ? =  (x = 0), ? =  [y = (tan)x]
C. ? = 0 (y = 0), ? =  [y = (tan )x], ? =  [y = (tan )x], ? =  [y = (tan )x], ? =  [y = (tan )x]
D. ? =  [y = (tan )x], ? =  [y = (tan )x], ? =  (x = 0), ? =  [y = (tan )x], ? =  [y = (tan )x]

Simplify the expression by multiplying. -3(-5x2)

A. -15x2 B. 15x2 C. 8x2 D. -8x2

Arrange the polynomial in descending powers of the variable. Then find its degree and leading coefficient.-9x + 3 + 7x2

A. -9x2 - 7x + 3, degree: 2, leading coefficient: -9 B. -7x2 - 9x + 3, degree: 2, leading coefficient: -7 C. 7x2 - 9x + 3, degree: 2, leading coefficient: 7 D. 7x2 - 12x, degree: 2, leading coefficient: 7

Solve triangle ABC. If necessary, round the answer to the nearest tenth.A = 29.2°, B = 28.2°, a = 21.0 feet

A. C = 123.7°, b = 20.3 ft, c = 36.3 ft B. C = 122.7°, b = 20.3 ft, c = 36.3 ft C. C = 123.7°, b = 36.3 ft, c = 20.3 ft D. C = 122.7°, b = 36.3 ft, c = 20.3 ft