Why f (x) = sin (180 / 3-x) = - sin (x-180 / 3) = sin (x + 360 / 3) = sin (x + 210-90) 180 is pie I can't get it out

Why f (x) = sin (180 / 3-x) = - sin (x-180 / 3) = sin (x + 360 / 3) = sin (x + 210-90) 180 is pie I can't get it out

F (x) = sin (180 / 3-x) = - sin (x-180 / 3) = sin (x + 360 / 3) = sin (x + 210-90) this is just a simple application of trigonometric function. I want to ask what grade are you in

What is the 360 quotient of the product of multiplying 12 by the difference between 36 and 19

360 / (36-19) / 12 = 30 / 17

What is the quotient of the product of 12 and 6 multiplied by 5 divided by 360?
At the same time, what's the difference between dividing and being divided

The sum of 12 and 6 denotes 12 + 6 and multiplication with 5 denotes (12 + 6) × 5 product divided by 360 denotes 360 △ 12 + 6) × 5 quotient is 4. There are two ways to read the division of two numbers -- "divide" and "divide". The divisor reads "divide" before the divisor, while the divisor reads "divide" before the divisor. For example, "15 △ 3" reads "15 divided by 3"

What's the quotient of 360 divided by two 60s?

That's 360 divided by 3600 equals 0.1