How do you show that #arctan(1/2)+arctan(1/3)=pi/4#?

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Answer 1 · 2015-06-05T15:25:56

#tan x = 1/2 --> x = 26.57# deg

#tan y = 1/3 --> y = 18.43# deg

#(x + y) = 45 deg = pi/4#

Answer 2 · 2015-06-05T16:16:52

Let #A = arctan(1/2)#, so that #-pi/2 < A < pi/4# and #tan A = 1/2#

(Note that, since #tan A# is positive, we can further conclude that # < A < pi/4# )

Let #B = arctan(1/3)#, so that #0 < B < pi/4# and #tan B = 1/3#

(As above, since the tangent of #B# is positive.)

We need to show that #A+B = pi/4#.

Use the formula for #tan(A+B)# to show that #tan (A+B)= 1#.

Conclude that #A+B = pi/4#.