Question #40645

1 Answer
mason m
May 9, 2016

#x=(7pi)/6+2kpi,(11pi)/6+2kpi#, where #k# is an integer

Explanation:

We have the equation:

#15sinx+7=sinx#

Subtract #7# from both sides.

#15sinx=sinx-7#

Subtract #sinx# from both sides.

#14sinx=-7#

Divide both sides by #14#.

#sinx=-1/2#

If we are restricting our domain from #0<=x<2pi#, our solutions are at the reference angles of #pi/6# in #"QIII"# and #"QIV"#, when #sinx# is negative. These values give us

#x=(7pi)/6,(11pi)/6#

However, if we don't restrict our domain, these two values and any angle #2pi# away will also satisfy the equation, thus the full solution is:

#x=(7pi)/6+2kpi,(11pi)/6+2kpi#, where #k# is an integer

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