If csc A=2 find the value of sin A
Well, well, well. Looks like we have a sine and a cosecant party going on! Now, if csc A equals 2, that means the reciprocal of sine of A is 2. So, sin A must be 1/2. Hurray for math parties!
To find the value of sin A, we can use the reciprocal identity:
sin A = 1 / csc A
Given that csc A = 2, we can substitute this value into the reciprocal identity:
sin A = 1 / 2
Therefore, the value of sin A is 1/2.
To find the value of sin A given that csc A is 2, we can use the reciprocal relationship between sine and cosecant.
The reciprocal relationship between sine (sin) and cosecant (csc) is as follows:
csc A = 1 / sin A
From the given information, csc A = 2. We can use this to find the value of sin A.
Substituting this value into the reciprocal relationship, we have:
2 = 1 / sin A
To find the value of sin A, we can rearrange the equation as follows:
sin A = 1 / 2
Therefore, the value of sin A is 1/2.
since you are asking about trig functions, it would be logical to assume that you can find the definitions.
csc A = 1/sinA
if that's difficult, please review your algebra I.