How to prove the value of cos a + sin a is greater than 1 ?

2 Answers
Cesareo R.
Dec 26, 2016

For 2kpi < a < pi/2+2kpi for k=0,1,2,cdots

Explanation:

If cos(a)+sin(a) > 1 then (cos(a)+sin(a) )^2=1+2 cos(a)sin(a) > 1 or
cos(a)sin(a) > 0
Concluding it is sufficient cos(a)sin(a) > 0 to verify
cos(a)+sin(a) > 1
or
2kpi < a < pi/2+2kpi for k=0,1,2,cdots

Attached a plot showing

cos(a)+sin(a) in blue
max(cos(a)sin(a),0) in red and
the constant 1 in green.

enter image source here

A. S. Adikesavan
Dec 26, 2016

sin a + cos a in [-sqrt 2, sqrt 2].

Explanation:

For a in (-oo, oo),

cos a + sin a=sqrt2 (1/sqrt2cos a+1/sqrt2 sin a)

=sqrt2(sin (pi/4)cos a+cos(pi/4)sin a

=sqrt2sin(a+pi/4) in [-sqrt2, sqrt2]

As a is not stated to be in an interval, I can assign a = -pi/4 to get

0 for sin a + cos a.

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