alpha+beta=22/7/2 and sin alpha=1/3 then what is sinbeta
To find the value of sin(beta), we need to first find the value of beta itself.
Given the equation alpha + beta = 22/7/2 and sin(alpha) = 1/3, let's solve for beta:
1. Rearrange the equation alpha + beta = 22/7/2 to isolate beta:
beta = 22/7/2 - alpha
2. Substitute the value of sin(alpha) = 1/3 into alpha:
Since sin(alpha) = 1/3, we need to find the corresponding angle alpha whose sine is 1/3. To do this, we can use the inverse sine function (also known as arcsin or sin^(-1)).
alpha = arcsin(1/3)
3. Calculate the value of alpha using a calculator:
Use a scientific calculator or an online calculator with trigonometric functions to find the value of arcsin(1/3). This will give you the value of alpha.
4. Substitute the value of alpha into the equation beta = 22/7/2 - alpha:
Substitute the value you obtained for alpha in step 3 into the equation beta = 22/7/2 - alpha. This will give you the value of beta.
Once you have the value of beta, you can find sin(beta) by taking the sine of the angle beta.