How do you find the limit of # (sin (4x)) / (tan(5x)) # as x approaches 0?

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Answer 1 · 2016-03-16T17:25:41

Use Algebra, trigonometry and the fundamental trigonometric limit.

#lim_(theta rarr0) sintheta/theta = 1#

We can use this to find #lim_(xrarr0) sin(7x)/x# because

#lim_(xrarr0) sin(7x)/x = lim_(xrarr0) 7/1sin(7x)/(7x)#

# = 7lim_(xrarr0) sin(7x)/(7x)#

Now, with #7x = theta# we see that #lim_(xrarr0) sin(7x)/(7x) = 1#

So we finish with

# 7lim_(xrarr0) sin(7x)/(7x) = 7(1) = 7##

We'll also need #lim_(theta rarr0) costheta = 1# (Cosine is continuous at #0#.)

#tan theta = sintheta/costheta#

Here is the solution

#sin(4x)/tan(5x) = sin(4x)/(sin(5x)/cos(5x))#

# = sin(4x)/1 cos(5x) 1/sin(5x)#

# = sin(4x)/4x * 4/1 cos(5x) 5x/sin(5x) * 1/5#

# = 4/5 [sin(4x)/4x] [cos(5x)] [5x/sin(5x)]#

Taking limits as #xrarr0# we get,

# = 4/5 [1][1][1] = 4/5#