To solve this problem, let's consider the solution sets of the given equations step by step.
Set A:
We start with the equation:
cos2x=cos2.
Since
cos=, we have
cos2=.
The solutions to this equation are:
x=nπ±, where
n∈ℤSet B:
We consider the equation:
cos2x=log16P.
Given
P+=10, finding
P involves solving the quadratic equation
p2−10p+16=0.
Factoring gives:
(p−8)(p−2)=0, so
p=8 or
p=2.
Thus,
cos2x=log168 or
cos2x=log162.
For
p=8,log168=(. since
=cos2()).
For
p=2,log162=.
Hence,
cos2x= aligns with
cos2x=cos2.
For
cos2x=, the solutions are:
x=2nπ± and
x=2nπ±, where
n∈ℤFinding
B−A :
Set
B includes solutions for both
cos2x= and
cos2x=.
Set
A only includes solutions for
cos2x=.
Therefore, the difference
B−A consists of solutions only when
cos2x=, which are:
B−A={x∈ℝlvertx=2nπ±.,2nπ±,n∈ℤ}