How can I prove \(\displaystyle{\left|{\tan{{\left({x}\right)}}}+{\tan{{\left({y}\right)}}}\right|}\ge{\left|{x}+{y}\right|}\) with the

mwombenizhjb

mwombenizhjb

Answered question

2022-03-26

How can I prove |tan(x)+tan(y)||x+y| with the Mean Value Theorem?
for all x,y[π2,π2]

Answer & Explanation

kaosimqu5t

kaosimqu5t

Beginner2022-03-27Added 10 answers

Apply the Mean Value Theorem to the function f(x)=tan(x). Since f(x)=1+tan2(x)1 we get
|tan(x)tan(y)||xy|
Note that
tan(y)=tan(y)
Upon substitution of -y for y in |tan(x)tan(y)||xy| we get
|tan(x)tan(y)||x+y|
Thus
|tan(x)+tan(y)||x+y|
yaum3xg1

yaum3xg1

Beginner2022-03-28Added 12 answers

Use the fact that |tan(x)tan(y)||xy|×f({1cos2(x)})=|xy|

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