-cotu+c
To simplify the expression -cot(u) + c, we need to understand the inverse trigonometric function cotangent
To simplify the expression -cot(u) + c, we need to understand the inverse trigonometric function cotangent.
The cotangent function (cot) is the ratio of the adjacent side to the opposite side of a right triangle. It is defined as the reciprocal of the tangent function:
cot(u) = 1 / tan(u)
Now, let’s substitute this value in the expression:
-cot(u) + c = -1 / tan(u) + c
We can rewrite this expression by finding the common denominator between -1 and tan(u), which is 1.
To do this, we multiply -1 by tan(u) and divide tan(u) by itself, resulting in:
-cot(u) + c = -tan(u) / tan(u) + c
Simplifying the numerator:
-cot(u) + c = -tan(u) + c
So, the simplified expression becomes -tan(u) + c.
Keep in mind that this simplification assumes that u represents an angle. If u represents a variable or constant, then -tan(u) + c is the final expression.
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