find value of A if sin A = cos A = Tan A /√2
Answers
Answer:
since sinA = 0
for A = nπ , n is any integer.
And cosnπ = +1 / -1 , for EVEN and ODD integer values of n respectively.
Similarly , cosA = 0
for A = (2m+1)*(π/2) , m is any integer.
and sin[(2m+1)(π/2)] = 1 / -1 for EVEN and ODD integer values of n respectively.
Also tanA = sinA/cosA
So tanA = 0 IF AND ONLY IF sinA = 0
And cosA can NEVER be zero in such cases.
So from above CONCLUSIONS ,
we can create 2 CONDITIONS for the given problem :
Condition 1 : A = (2m+1)(π/2) m is any integer .
So in such cases ,
LHS = sin[(2m+1)(π/2)] + cos[(2m+1)(π/2)]
= +1/-1 + 0 = +1/-1 which is CLEARLY non-zero.
RHS is zero.
So LHS is not equal to RHS , which violates the given equation since both sides of equation does not yield the same value for ALL those values of A for which cosA = 0 .
Thus cosA CAN NEVER be zero for this PROBLEM / EQUATION , else the problem is INVALID.
So, dividing both sides of equation by cosA we get,
tanA + 1 = √2 ,
obviously any possibility of cosA being 0 is AUTOMATICALLY ruled out because division by 0 is undefined.
Now tanA = √2 - 1 .
Step-by-step explanation:
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