Consider the following. r;(t) = (2t, t?, t³), r,(t) (sin(t), sin(3t), 5t) Find r',(t) and r'2(t). r'(t) = r'2(t) The curves r, (t) = (2t, t2, t) and r,(t) = (sin(t), sin(3t), 5t) intersect at the...

#9 13,.2

Consider the following.<br>r;(t) = (2t, t?, t³), r,(t)<br>(sin(t), sin(3t), 5t)<br>Find r',(t) and r'2(t).<br>r'(t)<br>=<br>r'2(t)<br>The curves r, (t) = (2t, t2, t) and r,(t) = (sin(t), sin(3t), 5t) intersect at the origin. Find their angle of intersection, 0, correct to the nearest degree.<br>Need Help?<br>Read It<br>

Extracted text: Consider the following. r;(t) = (2t, t?, t³), r,(t) (sin(t), sin(3t), 5t) Find r',(t) and r'2(t). r'(t) = r'2(t) The curves r, (t) = (2t, t2, t) and r,(t) = (sin(t), sin(3t), 5t) intersect at the origin. Find their angle of intersection, 0, correct to the nearest degree. Need Help? Read It

Jun 04, 2022

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Consider the following. r;(t) = (2t, t?, t³), r,(t) (sin(t), sin(3t), 5t) Find r',(t) and r'2(t). r'(t) = r'2(t) The curves r, (t) = (2t, t2, t) and r,(t) = (sin(t), sin(3t), 5t) intersect at the...

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