Math, asked by kiarnrani538, 1 year ago

evaluate limit x-0 tanx°/x

Answers

Answered by vikas19july
0

Answer:

Step-by-step explanation:

Attachments:
Answered by Anonymous
2

  • SOLUTION:-

 \tt  \: lim_{x \to 0} \:  \:  \frac{ \tan(x°) }{x}  \\  \\  \tt  \implies\: lim_{x \to 0} \:  \:  \frac{ \tan(x) }{x}  \\  \\  \tt \:  \implies 1 \\  \\

  • Explanation:-

Here θ is measured in radian.

And 0° = 0 radian.

This was Limit of trigonometric Function.

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More Information:

1) lim x->0 (θ/sinθ) = 1

2) lim x-> 0 (tanθ/θ) = 1

3) lim x-> 0 (θ/tanθ) = 1

4) lim x->0 (sin pθ/pθ) = 1

5) lim x ->0 (tan pθ/pθ) = 1

6) lim x->0 (pθ/tan pθ) = 1

7) lim x->0 (pθ/ sin pθ) = 1

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