Math, asked by m4madhav0471, 8 days ago

A rectangular field with length (4x-2) metre and breadth 2x metre requires 4(x+2) metre of rope for fencing around it. Find its dimensions.

Answers

Answered by riddhikamra

0

Answer:

hi...not done this in school yet so sorry...

Step-by-step explanation:

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Answered by muskansingh26

1

Answer:

$Answer:</p><p>inprovement</p><p></p><p>\rm :\longmapsto\:\displaystyle\lim_{ \sf \: x \to \: - \: \infty} \: \sf \: sin \frac{1}{x}::⟼ </p><p>x→−∞</p><p>lim</p><p> </p><p> sin </p><p>x</p><p>1</p><p> </p><p> :</p><p></p><p></p><p>\large\underline{\sf{Solution-}} </p><p>Solution−</p><p> </p><p> </p><p></p><p>Given expression is</p><p></p><p>\rm :\longmapsto\:\displaystyle\lim_{ \sf \: x \to \: - \: \infty} \: \sf \: sin \frac{1}{x}::⟼ </p><p>x→−∞</p><p>lim</p><p> </p><p> sin </p><p>x</p><p>1</p><p> </p><p> :</p><p></p><p>To evaluate this limit, we use method of Substitution</p><p></p><p>To evaluate this limit, we use method of SubstitutionSo, Substitute,</p><p>\red{\rm :\longmapsto\:x \: = \: - \: \dfrac{1}{y}}::⟼x=− </p><p>y</p><p>1</p><p> </p><p> :</p><p></p><p></p><p></p><p>\red{\rm :\longmapsto\:As \: x \: \to \: - \infty , \: so \: \: y \: \to \: 0 \: }::⟼Asx→−∞,soy→0:</p><p></p><p>So, above expression</p><p></p><p>\rm :\longmapsto\:\displaystyle\lim_{ \sf \: x \to \: - \: \infty} \: \sf \: sin \frac{1}{x}::⟼ </p><p>x→−∞</p><p>lim</p><p> </p><p> sin </p><p>x</p><p>1</p><p> </p><p> :</p><p></p><p>can be rewritten as</p><p></p><p>\rm \: = \: \displaystyle\lim_{ \sf \: y \to 0} \: \sf \: sin( - y)== </p><p>y→0</p><p>lim</p><p> </p><p> sin(−y)=</p><p></p><p>\rm \: = \: - \: \sf\displaystyle\lim_{ \sf \: y \to 0} \: \sf \: sin( y)==− </p><p>y→0</p><p>lim</p><p> </p><p> sin(y)=</p><p></p><p>\sf\rm \: = \: - \: sin0=−sin0</p><p></p><p>\rm \: = \: 0=0</p><p></p><p>Hence,</p><p></p><p>\red{\rm :\longmapsto\:\boxed{ \tt{ \: \displaystyle\lim_{ \sf \: x \to \: - \: \infty} \: \sf \: sin \frac{1}{x} = 0 \: }}}::⟼ </p><p>x→−∞</p><p>lim</p><p> </p><p> sin </p><p>x</p><p>1</p><p> </p><p> =0</p><p> </p><p> :</p><p></p><p>▬▬▬▬▬▬▬▬▬▬▬▬▬▬▬▬▬▬▬$

Step-by-step explanation:

$Answer:</p><p>inprovement</p><p></p><p>\rm :\longmapsto\:\displaystyle\lim_{ \sf \: x \to \: - \: \infty} \: \sf \: sin \frac{1}{x}::⟼ </p><p>x→−∞</p><p>lim</p><p> </p><p> sin </p><p>x</p><p>1</p><p> </p><p> :</p><p></p><p></p><p>\large\underline{\sf{Solution-}} </p><p>Solution−</p><p> </p><p> </p><p></p><p>Given expression is</p><p></p><p>\rm :\longmapsto\:\displaystyle\lim_{ \sf \: x \to \: - \: \infty} \: \sf \: sin \frac{1}{x}::⟼ </p><p>x→−∞</p><p>lim</p><p> </p><p> sin </p><p>x</p><p>1</p><p> </p><p> :</p><p></p><p>To evaluate this limit, we use method of Substitution</p><p></p><p>To evaluate this limit, we use method of SubstitutionSo, Substitute,</p><p>\red{\rm :\longmapsto\:x \: = \: - \: \dfrac{1}{y}}::⟼x=− </p><p>y</p><p>1</p><p> </p><p> :</p><p></p><p></p><p></p><p>\red{\rm :\longmapsto\:As \: x \: \to \: - \infty , \: so \: \: y \: \to \: 0 \: }::⟼Asx→−∞,soy→0:</p><p></p><p>So, above expression</p><p></p><p>\rm :\longmapsto\:\displaystyle\lim_{ \sf \: x \to \: - \: \infty} \: \sf \: sin \frac{1}{x}::⟼ </p><p>x→−∞</p><p>lim</p><p> </p><p> sin </p><p>x</p><p>1</p><p> </p><p> :</p><p></p><p>can be rewritten as</p><p></p><p>\rm \: = \: \displaystyle\lim_{ \sf \: y \to 0} \: \sf \: sin( - y)== </p><p>y→0</p><p>lim</p><p> </p><p> sin(−y)=</p><p></p><p>\rm \: = \: - \: \sf\displaystyle\lim_{ \sf \: y \to 0} \: \sf \: sin( y)==− </p><p>y→0</p><p>lim</p><p> </p><p> sin(y)=</p><p></p><p>\sf\rm \: = \: - \: sin0=−sin0</p><p></p><p>\rm \: = \: 0=0</p><p></p><p>Hence,</p><p></p><p>\red{\rm :\longmapsto\:\boxed{ \tt{ \: \displaystyle\lim_{ \sf \: x \to \: - \: \infty} \: \sf \: sin \frac{1}{x} = 0 \: }}}::⟼ </p><p>x→−∞</p><p>lim</p><p> </p><p> sin </p><p>x</p><p>1</p><p> </p><p> =0</p><p> </p><p> :</p><p></p><p>▬▬▬▬▬▬▬▬▬▬▬▬▬▬▬▬▬▬▬$

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