Question: If $\tan ({\text{A + B) = }}\dfrac{1}{{\sqrt 3 }}$ and \(\tan ({\text{A - B) = }}\dfrac{1}{{\sqrt ...

Question

If $\tan ({\text{A + B) = }}\dfrac{1}{{\sqrt 3 }}$ and $\tan ({\text{A - B) = }}\dfrac{1}{{\sqrt 3 }}$ , ${0^0}$ < A + B < ${90^0}$ . Find A and B.

Answer 1

Solution

Hint: Compare the given two trigonometric functions and use the value of tan ${30^0}$ is $\dfrac{1}{{\sqrt 3 }}$ and period of tangent is ${180^0}$ .

Given,
$\tan ({\text{A + B) = }}\dfrac{1}{{\sqrt 3 }}$ ………………………………………………………..(1)
$\tan ({\text{A - B) = }}\dfrac{1}{{\sqrt 3 }}$ ………………………………………………………….(2)
So, the period of tan is ${180^0}$ . Neither A nor B can be near this angle because we have stated in the question that the sum of A and B must be less than 90 $^0$ .
So, from equation (1) and (2)
tan(A+B) = tan(A – B)
Equating the angles of tangents , we get
A + B = A – B
A + B – A + B = 0
2B = 0
B = 0 $^0$
Putting the value of B in equation (1), we get
tan(A + 0) = $\dfrac{1}{{\sqrt 3 }}$
tanA = tan ${30^0}$
A = ${30^0}$ .
Hence,
A = ${30^0}$ and B = 0 $^0$ is the answer.

Note: In these types of questions, the periodicity of the trigonometric function matters. Periodicity is the property of the function such that it repeats itself after a fixed interval of time called period of the function.

Question: If \(\tan ({\text{A + B) = }}\dfrac{1}{{\sqrt 3 }}\) and \(\tan ({\text{A - B) = }}\dfrac{1}{{\sqrt ...

Solution