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प्रश्न
If θ = 30° verify `tan 2 theta = (2 tan theta)/(1 - tan^2 theta)`
उत्तर
Given θ = 30° ....(1)
To verify
`tan 2 theta = (2 tan theta)/(1 - tan^2 theta)`
Now consider LHS of the expression to be verified in equation (2)
Therefore
L.H.S = `tan 2 theta`
Now by substituting the value of θ from equation (1) in the above expression.
We get
LHS = `tan 2 xx (30^@)`
`= tan 60^@`
`= sqrt3`
Now by substituting the value of θ from equation (1) in the expression `(2 tan theta)/(1- tan^ theta)`
We get
RHS = `(2tan (30^@))/(1 - tan^2 (30^@))` .....(4)
RHS = `(2xx1/sqrt3)/(1- (1/sqrt3)^2)`
`= (2/sqrt3)/((3-1)/3)`
`= sqrt3`
Now by comparing equation (3) and (4)
We get
LHS = RHS = `sqrt3`
Hence `tan 2 theta = (2 tan theta)/(1 - tan^2 theta)`
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