If a stone is tossed from the of a 310 meter building, the height of the stone as a function of time is given by h(t)= 9.8t^2 -10t +310

actually, it is

h(t) = 310 ± 10t - 4.9t^2

± depending on whether it is thrown up or down.

The given equation represents the height of the stone (h) as a function of time (t). To find the height of the stone at a specific time, you can substitute the value of t into the equation and calculate the result.

Let's say we want to find the height of the stone after 2 seconds. We can substitute t = 2 into the equation:

h(t) = 9.8t^2 - 10t + 310
h(2) = 9.8(2)^2 - 10(2) + 310
h(2) = 9.8(4) - 20 + 310
h(2) = 39.2 - 20 + 310
h(2) = 329.2

Therefore, the height of the stone after 2 seconds is 329.2 meters.

To find other values of height at different times, you can follow the same process by substituting the desired value of t into the equation.