Consider the closed heart curve y(t) = |t|^3/4 *(sin(t),cos(t)) with -pi st

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Consider the closed heart curve y(t) = |t|^3/4<br>*(sin(t),cos(t)) with -pi st <<br>T below.<br>(a) Write a computable characterization of<br>the area contained within y(t)<br>using the Divergence Theorem.<br>(b) Compute the area contained within y(t)<br>using the integral above.<br>

Extracted text: Consider the closed heart curve y(t) = |t|^3/4 *(sin(t),cos(t)) with -pi st < t="" below.="" (a)="" write="" a="" computable="" characterization="" of="" the="" area="" contained="" within="" y(t)="" using="" the="" divergence="" theorem.="" (b)="" compute="" the="" area="" contained="" within="" y(t)="" using="" the="" integral="">

Jun 05, 2022

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Consider the closed heart curve y(t) = |t|^3/4 *(sin(t),cos(t)) with -pi st

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