hadi amiri 4
Aug18-08, 11:02 AM
\lim_{x \rightarrow infinity}/ left(\frac{\1+Tan\frac{/pi}{2x}}{1+sin\frac{/pi}{3x}}}right)^x
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hadi amiri 4
Aug18-08, 11:03 AM
sorry i made mistake in typing
statdad
Aug18-08, 11:43 AM
So what does the limit problem actually look like?
NoMoreExams
Aug18-08, 01:34 PM
\lim_{x \rightarrow infinity}/ left(\frac{\1+Tan\frac{/pi}{2x}}{1+sin\frac{/pi}{3x}}}right)^x
I assume you meant
\lim_{x \rightarrow {\infty}} \left(\frac{1 \, + \, tan\left(\frac{\pi}{2x}\right)}{1 \, + \, sin \left(\frac{\pi}{3x}\right)} \right)^{x}
then I would suggest letting that = y, then take ln of both sides and you should get something like:
ln(y) \, = \, \lim_{x \rightarrow {\infty}} \frac{ln\left(\frac{1 \, + \, tan\left(\frac{\pi}{2x}\right)}{1 \, + \, sin \left(\frac{\pi}{3x}\right)} \right)}{\frac{1}{x}}
which if you "plug in" the limit should give you \frac{0}{0} making it a candidate for L'hopital. Try that.
I assume you meant
\lim_{x \rightarrow {\infty}} \left(\frac{1 \, + \, tan\left(\frac{\pi}{2x}\right)}{1 \, + \, sin \left(\frac{\pi}{3x}\right)} \right)^{x}
then I would suggest letting that = y, then take ln of both sides and you should get something like:
ln(y) \, = \, \lim_{x \rightarrow {\infty}} \frac{ln\left(\frac{1 \, + \, tan\left(\frac{\pi}{2x}\right)}{1 \, + \, sin \left(\frac{\pi}{3x}\right)} \right)}{\frac{1}{x}}
which if you "plug in" the limit should give you \frac{0}{0} making it a candidate for L'hopital. Try that.
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