How do you solve the following equation #tan(3t)=sqrt(3)# in the interval [0, 2pi]?

1 Answer
Shwetank Mauria
Dec 10, 2016

Solution is #t={pi/9,(4pi)/9,(7pi)/9,(10pi)/9,(13pi)/9,(16pi)/9}#

Explanation:

We have #tan(pi/3)=sqrt3# and as the ratio tangent repeats after every #pi#,

Solution of #tan(3t)=sqrt3# has solution

#3t={pi/3,(4pi)/3,(7pi)/3,(10pi)/3,(13pi)/3,(16pi)/3,(19pi)/3,(22pi)/3......}# and

#t={pi/9,(4pi)/9,(7pi)/9,(10pi)/9,(13pi)/9,(16pi)/9,(19pi)/9,(22pi)/9......}#.

But as we seek solution in interval #0<=t<=2pi#

Solution is #t={pi/9,(4pi)/9,(7pi)/9,(10pi)/9,(13pi)/9,(16pi)/9}#

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