t^(2)-3,2t^(4)+3t^(3)-2t^(2)-9t-12

Check whether g(t)=t^(2)-3 is a factor of f(t)=2t^(4)+3t^(3)-2t^(2)-9t-12 by applying the division algorithm.

Check whether g(t)=t^2-3 is a factor of f(t)=2t^4+3t^3-2t^2-9t-12 by applying the division algorithm.

Simplify (12t^(2)-22t+8)/(3t)÷(3t^(2)+2t-8)/(2t^(2)+4t)

Subtract : 3t ^(4) - 4t ^(3) + 2t ^(2) - 6t + 6 from - 4t ^(4) + 8t ^(3) - 4t ^(2) - 2t + 11

What must be added to 11t^(3)+5t^(4)+6t^(5)-3t^(2)+t+5 , so that the resulting polynomial is exactly divisible by 4-2t+3t^(2) ?

What must be added to 11t^(3)+5t^(4)+6t^(5)-3t^(2)+t+5 , so that the resulting polynomial is exactly divisible by 4-2t+3t^(2) ?

If u = 3t^(4) - 5t^(3) + 2t^(2) - 18t+4 , find (du)/(dt) at t = 1 .

FInd (dy)/(dx) If x=2t^(2)+17t-1,y=3t^(4)-8t^(2)+9

Here are four descriptions of the position (in meters) of a puck as it moves in an xy plane: (1) x=-3t^(2)+4t-2andy=6t^(2)-4t (2) x=-3t^(3)-4t andy=-5t^(2)+6 (3) vecr=2t^(2)hati-(4t+3)hatj (4) vecr=(4t^(3)-2t)hati+hatj Are the x and y acceleration components constant? Is acceleration veca constant?