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A man 6.00 ft tall approaches a street light 15.0 ft above the ground at the rate of 4.00 ​ft/s. How fast is the end of the​ man's shadow moving when he is 14.0 ft from the base of the​ light?
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A man 6.00 ft tall approaches a street light 15.0 ft above the ground at the rate of 4.00 ​ft/s. How fast is the end of the​ man's shadow moving when he is 14.0 ft from the base of the​ light?

User Atastrophic
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5.5k points

1 Answer

2 votes

Answer:


(dx)/(dt) = 10 ft/s

Step-by-step explanation:

As per given figure let say the tip of the shadow is at distance "x" from the base of the lamp

so here we have


(x)/(15) = (x - y)/(6)

so we have


6x = 15 x - 15 y


15 y = 9 x

now we have


5(dy)/(dt) = 2(dx)/(dt)


5(4) = 2(dx)/(dt)


(dx)/(dt) = 10 ft/s

A man 6.00 ft tall approaches a street light 15.0 ft above the ground at the rate-example-1
User Emanuel Miranda
by
5.6k points
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