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Basic Mathematics – I
Notes To find the general solution of the equation sin = 0
It is given that sin = 0
But we know that sin 0, sin , sin 2 , ...., sin n are equal to 0
= n , n N
But we know that sin( ) = sin = 0
sin( ) , sin( 2 ), sin( 3 ) ,...., sin( n ) = 0
= n , n I.
Thus, the general solution of equations of the type sin = 0 is given by = n where is an
integer.
To find the general solution of the equation cos = 0
It is given that cos = 0
But in practice we know that cos /2 = 0. Therefore, the first value of is
= /2 …(1)
We know that cos ( + ) = cos or cos( + /2) = cos /2 = 0.
or cos 3 /2 = 0
In the same way, it can be found that 9
cos 5 /2, cos 7 /2,cos 9 /2,....., cos( 2n + 1) /2 are all zero
( 2n + 1) /2, n N
But we know that cos( ) = cos
cos( /2) = cos( 3 /2) = cos( 5 /2) = cos{ (2n 1) /2} = 0
= (2n + 1) /2, n I
Therefore, = (2n + 1) /2 is the solution of equations cos = 0 for all numbers whose cosine is
0.
To find a general solution of the equation tan = 0
It is given that tan =0
or sin /cos = 0 or sin = 0
i.e. = n , n I.
We have consider above the general solution of trigonometric equations, where the right hand is
zero. In the following equation, we take up some cases where right hand side is non–zero.
To find the general solution of the equation sin = sin
It is given that sin = sin
sin sin = 0
or 2cos ( + /2) sin( /2) = 0
Either cos ( + /2) = 0 or sin( /2) = 0
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