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Section 4.7
Question 54
sin (arccos sqrt{5})
Let u = arccos sqrt{5}.
This means that cos u = sqrt{5}/1.
The range of the arccos function is [0, pi]. I know that cos u is positive in quadrant 1.
cos u = adj/hyp. I draw a right triangle in quadrant 1 to find the opposite side.
I will use a^2 + b^2 = c^2 to find the opposite side.
Let b = opposite side of right triangle.
(sqrt{5})^2 + b^2 = 1^2
5 + b^2 = 1
b^2 = 1 - 5
b^2 = -4
Can't take the square of a negative numbers outside the complex number system.
So, I cannot calculate the opposite side of the right triangle formed in quadrant 1
My conclusion is as follows:
sin (arccos sqrt{5}) is undefined.
You say?
Question 54
sin (arccos sqrt{5})
Let u = arccos sqrt{5}.
This means that cos u = sqrt{5}/1.
The range of the arccos function is [0, pi]. I know that cos u is positive in quadrant 1.
cos u = adj/hyp. I draw a right triangle in quadrant 1 to find the opposite side.
I will use a^2 + b^2 = c^2 to find the opposite side.
Let b = opposite side of right triangle.
(sqrt{5})^2 + b^2 = 1^2
5 + b^2 = 1
b^2 = 1 - 5
b^2 = -4
Can't take the square of a negative numbers outside the complex number system.
So, I cannot calculate the opposite side of the right triangle formed in quadrant 1
My conclusion is as follows:
sin (arccos sqrt{5}) is undefined.
You say?
