To solve the given series equation: 1+sin‌x+sin‌2x+sin‌3x+...=4+2√3 we recognize that this is an infinite geometric series with the first term a=1 and the common ratio r=sin‌x. The sum of an infinite geometric series is given by: S=‌
a
1−r
Here, substituting the given values: ‌
1
1−sin‌x
=4+2√3 To find sin‌x, we solve: 1−sin‌x=‌
1
4+2√3
Rationalizing the denominator gives: 1−sin‌x=‌