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Dan Berindei · Answer 1 · 2024-02-24T00:46:33+0000

Final answer:

To find the rate of change of the demand, differentiate the given equation with respect to time and solve for dx/dt.

Step-by-step explanation:

To find the rate of change of the demand, we need to differentiate the given equation with respect to time. Let's differentiate the equation:

4x(dx/dt) + 4p + 4xdp/dt + 100p(dp/dt) = 0

Now, we can substitute the given values to solve for dx/dt:

4(10)(dx/dt) + 4(10) + 4(10)(2) + 100(10)(dp/dt) = 0

(40 + 40 + 80)dx/dt + 1000(dp/dt) = 0

160dx/dt + 1000(dp/dt) = 0

160dx/dt = -1000(dp/dt)

dx/dt = -6.25(dp/dt)

Therefore, the rate of change of the demand is -6.25 times the rate of change of the price.

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