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A decreasing curve with an arrow on the end is plotted on a coordinate plane. The curve begins at the point left parenthesis 0 comma 700 right parenthesis.
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The value of a cell phone decreases exponentially at a rate of 24% each year after its release date. If the initial value of the phone is $700, the situation can be modeled by the equation v(t)=700(0.76)t
, where v is the value of the cell phone t years since its release date. Interpret the graph of the equation and identify the true statement.
(1 point)
Responses
As t increases, v decreases quickly at first and then slowly.
As t increases, v decreases quickly at first and then slowly.
As t increases, v increases quickly at first and then slowly.
As t increases, v increases quickly at first and then slowly.
As t increases, v decreases slowly at first and then quickly.
As t increases, v decreases slowly at first and then quickly.
As t increases, v increases slowly at first and then quickly.
All Answers 1
Answered by
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As t increases, v decreases quickly at first and then slowly.
Explanation: v(t)=700(0.76)^t is exponential decay (base 0.76<1), so the phone loses value rapidly soon after release and the rate of decrease slows over time, approaching 0.
Explanation: v(t)=700(0.76)^t is exponential decay (base 0.76<1), so the phone loses value rapidly soon after release and the rate of decrease slows over time, approaching 0.
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