Find the area enclosed by the loop in the graph of the curve &: x(t) = t?, y(t) t3 – 3t by evaluating an integral of the ·t1 | - y(t) · x'(t) dt for a form: suitable choices of to and t1 (where t,

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Find the area enclosed by the loop<br>in the graph of the curve &:<br>x(t) = t?, y(t)<br>t3 – 3t<br>by evaluating an integral of the<br>·t1<br>| - y(t) · x'(t) dt<br>for a<br>form:<br>suitable choices of to and t1<br>(where t, < t, and Pto = Pt, = P).<br>%3D<br>8: x(t)= ? , y(t) = t³ – 3t<br>

Extracted text: Find the area enclosed by the loop in the graph of the curve &: x(t) = t?, y(t) t3 – 3t by evaluating an integral of the ·t1 | - y(t) · x'(t) dt for a form: suitable choices of to and t1 (where t, < t,="" and="" pto="Pt," =="" p).="" %3d="" 8:="" x(t)="?" ,="" y(t)="t³" –="">

Jun 04, 2022

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Find the area enclosed by the loop in the graph of the curve &: x(t) = t?, y(t) t3 – 3t by evaluating an integral of the ·t1 | - y(t) · x'(t) dt for a form: suitable choices of to and t1 (where t,

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