Let $s$ be the horizontal distance of the kite in feet at time $t$ in seconds. The length of the string is $2t$.
Pythagoras gives: $$(2t)^2=s^2+(100)^2$$
The easiest approach now is to use implicit differentiation with respect to $t$ to give $$8t=2s\frac {ds}{dt}$$ or $$\frac {ds}{dt}=\frac {4t}s$$
The length of the string at the point you are interested in is $2t=125$, and pythagoras gives $s=75$ (note this is not the length of the string but the horizontal distance in feet. We therefore have $$\frac {ds}{dt}=\frac {2\times 125}{75}=\frac {10}3 \text { feet per second}$$And this accords with the answer you put in your comment.
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Note: implicit differentiation uses the chain rule $$\frac {d (f(y))}{dx}=\frac {d(f(y))}{dy}\cdot\frac {dy}{dx}$$
Here it is simpler than taking square roots to find an explicit equation for $s$ in terms of $t$.