t^(2)-15

Differentiate 7x^(5)-11x^(2) w.r.t. 7x^(2)-15x .

Let y=f(x) be a parametrically defined expression such that x=3t^(2)-18t+7 and y=2t^(3)-15t^(2)+24t+10,AA t in[0,6] Then the minimum and maximum values of y=f(x) are (A) 36,3(B)46,6(C)40,-6(D)46,-6

A particle moves on x-axis with a velocity which depends on time as per equation v=t^(2)-8t+15(m//s) where time t is in seconds. Match the columns.

A particle moves on x-axis with a velocity which depends on time as per equation v=t^(2)-8t+15(m//s) where time t is in seconds. Match the columns.

A particle moves along a horizontal line such that its equation of motion is s(t) = 2t^(3) - 15t^(2) + 24t -2 , s in meters and t in second. At what time the particle is at rest

If displacement of particle is s=t^(3)-6t^(2)+9t+15, then velocity of the particle at beginning is

The domain of the funciton f(x) given by 3^(x) + 3^(f) = "min" (2t^(3) - 15t^(2) + 36t - 25, 2 + |sin t| , 2 le t le 4) is

The domain of the funciton f(x) given by 3^(x) + 3^(f) = "min" (2t^(3) - 15t^(2) + 36t - 25, 2 + |sin t| , 2 le t le 4) is

The domain of the funciton f(x) given by 3^(x) + 3^(f) = "min" (2t^(3) - 15t^(2) + 36+ - 25, 2 + |sin t| , 2 le t le 4) is

The domain of the funciton f(x) given by 3^(x) + 3^(f) = "min" (2t^(3) - 15t^(2) + 36+ - 25, 2 + |sin t| , 2 le t le 4) is