sin(x + π/6) = 0
To solve for x, we first need to find the values of x that make sin(x + π/6) equal to 0.
sin(x + π/6) = 0 when x + π/6 = nπ, where n is an integer. This is because the sine function has a value of 0 at multiples of π.
So, we have:
x + π/6 = nπ
Subtracting π/6 from both sides:
x = nπ - π/6
Therefore, the solution for x is:
x = (nπ - π/6), where n is an integer.
sin(x + π/6) = 0
To solve for x, we first need to find the values of x that make sin(x + π/6) equal to 0.
sin(x + π/6) = 0 when x + π/6 = nπ, where n is an integer. This is because the sine function has a value of 0 at multiples of π.
So, we have:
x + π/6 = nπ
Subtracting π/6 from both sides:
x = nπ - π/6
Therefore, the solution for x is:
x = (nπ - π/6), where n is an integer.