Let f(x)=a sin(3x), where 𝑎 is constant. 𝑓′(𝜋)=2, then 𝑎 is equal to

∫x^2−(1/x^2)+sinx. dx   is   

If y=(4−9x^4)^1/2, then dy/dx = 

Determine the equation of the asymptote for the function f(x)= log9(x-3)-4

Rainwater is being collected in a water tank. The rate of change of volume, V L, with respect to time, 𝑡 seconds, is given by

dV/dt=5t+2

The volume of water that is collected in the tank between times 𝑡=2 and 𝑡=6 is

Without using a calculator, find all the values of x𝑥 between 0 and 2𝜋 for 2cos(3x)+√3=0

The area bounded by the curve y=1/(3−x), the 𝑥-axis, the 𝑦-axis and the line 𝑥=2 is

The graph of y=ax^3+bx^2+cx+d touches the line 2y+6x=15 at the point A(0,7.5) and has a stationary point at B(3,−6). Find the values of 𝑎, 𝑏, 𝑐 and 𝑑.

solve for x - log4(4x+16)-log4(x^2-2)=1

A long trough with a parabolic cross-section is 1.5 metres wide at the top and 2 metres deep. Find the depth of water when the trough is half full.

Solve each of the following equations for x:

∫sinx/cosx   .dx between pi/4 and pi/3

Find the coordinates of the stationary points of the curve with equation y=x/(x^2+1)

Solve the equation log5x=16logx5

After 𝑡 seconds (𝑡≥0), a particle has acceleration 𝑎=𝑘𝑡 m/s^2, where 𝑘 is a constant. Given that, after 2 seconds, the particle’s displacement is 7 m and its velocity is 4 m/s, find the value of 𝑘.