1 Answer

IceWhisper · Answer 1 · 2021-01-15T13:11:43+0000

Recall the Pythagorean identity,

$1-\cos^2t=\sin^2t$

To get this expression in the fraction, multiply the numerator and denominator by
$1+\cos t$ :

$(t\sin t)/(1-\cos t)\cdot(1+\cos t)/(1+\cos t)=(t\sin t(1+\cos t))/(\sin^2t)=(t(1+\cos t))/(\sin t)$

Now,

$\displaystyle\lim_(t\to0)(t\sin t)/(1-\cos t)=\lim_(t\to0)\frac t{\sin t}\cdot\lim_(t\to0)(1+\cos t)$

The first limit is well-known and equal to 1, leaving us with

$\displaystyle\lim_(t\to0)(1+\cos t)=1+\cos0=\boxed{2}$

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