Question

How do you verify that the x values `pi/16, (3pi)/16` are solutions to `2cos^2 4x-1=0`?

Answer 1

given values are solutions to the equation.

Explanation:

Substitute each of the values into the left side of the equation and if they are solutions then the left side should equal zero, the right side of the equation.

`"Note that " cos^2 4x=(cos4x)^2`

`color(blue)(x=pi/(16))`

`"left side " =2cos^2(4xxpi/(16))-1`

`=2(cos(pi/4))^2-1=2xx(1/sqrt2)^2-1`

`=2xx1/2-1=0=" right side, hence a solution"`

`color(blue)(x=(3pi)/16)`

`"left side " =2cos^2(4xx(3pi)/16)-1`

`=2(cos((3pi)/4))^2-1`

`=2(-cos(pi/4))^2-1`

`=2xx(-1/sqrt2)^2-1`

`=2xx1/2-1=0=" right side, hence a solution"`