A ball is thrown upwards, from a building. It's height(h), in meters above the ground seconds(t) after being thrown is given by h(t)=-5t^2+15t+50

You know that the initial height is the constant term. So, the building is 50m tall

The ball hits the ground when the height is zero. So, just solve for t when h=0

I assume you want to know how long the ball is at least 55m above the ground. It is only at 50m for an instant. So, we want

-5t^2+15t+50 >= 55
1/2 (3-√5) <= t <= 1/2 (3+√5)

http://www.wolframalpha.com/input/?i=+-5t^2%2B15t%2B50+%3E%3D+55

a) h(t)=-5t^2+15t+50
h(0)=0+0+50
h=50