sin theta = squre roote of 3 over 4
what is the number feared by pythagoreans, since it lies halfway between the only two intergers that can be both the perimeter and the area of the same rectangle
Here is a hint. 16 is one of the integers.
Calculate the results of
2x2
2x3
2x4
2x5 etc.
Then
3x3
3x4
3x5
3x6 etc.
Then
4x4
4x5
4x6
4x7 etc.
you will soon find your answers.
17
13
syed , this is one of the standard angles. That is, if you mean sin(theta) = sqrt(3)/2
In radians it's pi/6. Find it in degrees too.
To find the angle in radians, we can use the inverse sine function (also known as arcsine) on the given value of sin(theta):
theta = arcsin(sqrt(3)/2)
Using a calculator or a tool that can evaluate trigonometric functions, we can find the value of theta as approximately 1.047 radians.
To convert this angle to degrees, we can use the conversion factor that pi radians is equal to 180 degrees:
theta (in degrees) = (1.047 radians) * (180 degrees/pi)
Evaluating this expression, we find that theta is approximately 60 degrees.
So the angle that satisfies sin(theta) = sqrt(3)/2 is approximately 1.047 radians or 60 degrees.