Compute lim (x→0) sin(5x)/ x without using L'hopital rule

[hndalama]

Compute lim (x→0) sin(5x)/ x without using L'hopital rule

I don't know what to do

 

[Deleted member 4993]

I don't know what to do

Use the fact that

\(\displaystyle \lim_{x \to 0}\left[\dfrac{sin(x)}{x}\right] \ = \ 1\)

 

[hndalama]

Use the fact that

\(\displaystyle \lim_{x \to 0}\left[\dfrac{sin(x)}{x}\right] \ = \ 1\)

but what do i do with the 5x that's inside the sin?

 

[Deleted member 4993]

but what do i do with the 5x that's inside the sin?

Use the fact that

\(\displaystyle \lim_{x\to 0}\left [\dfrac{sin(5x)}{5x}\right ] \ = \ 1\)

 

[Steven G]

Compute lim (x→0) sin(5x)/ x without using L'hopital rule

I don't know what to do

If lim (x→0) sin(x)/ x =1, then lim (x→0) sin(14x)/ (14x) = 1, then lim (x→2) sin(x-2)/ (x-2) = 1 and lim (x→00) sin(1/x)/ (1/x) =1

Two things need to happen to get 1

1) the angle (what you are taking sin of) and what you are dividing by must be the same.

and 2) what x is approaching should make the angle approach 0.

Also note that lim(x→0) x/sin(x) =1

Bonus: \(\displaystyle lim(x→0) \dfrac{sin(ax)}{bx} = lim(x→0) \dfrac{a}{a}\dfrac{sin(ax)}{bx}= lim(x→0) \dfrac{a}{b}\dfrac{sin(ax)}{ax}\)
\(\displaystyle =\dfrac{a}{b}lim(x→0) \dfrac{sin(ax)}{ax}=(\dfrac{a}{b})1 \ \ =\dfrac{a}{b}\)

Do you see that you can read off the answer?? Do you see how you can use the above factto read off the answer to your problem??

 

[hndalama]

thank you