Let be a thrice differentiable function in . Let the tangents to the curve at and make angles and , respectively, with the positive -axis. If , where and are integers, then the value of equals:
- A
- B
- C
- D
Let be a thrice differentiable function in . Let the tangents to the curve at and make angles and , respectively, with the positive -axis. If , where and are integers, then the value of equals:
Correct answer:B
Standard Method
Given: The tangents at and make angles and with the positive -axis.
Find: The value of .
From slope of tangent,
the solution evaluates the integral by substituting
so that
Then,
According to the extracted solution, the intended expression is scaled to give integer coefficients:
Hence,
and therefore
So, the correct option is B.
Note: The solution itself flags a discrepancy in the printed integral and proceeds with the intended form to obtain the listed answer.
Using slopes and substitution
Given: The tangent slopes are determined by the given angles.
Identify principle: If a tangent makes angle with the positive -axis, then its slope is .
Thus,
Now use the substitution suggested by the integrand:
Then,
Therefore,
With the corresponding limits used in the solution,
So,
The extracted solution then compares the scaled expression with :
Hence,
Thus,
Therefore, the correct option is B.
Using and instead of and . The angle of the tangent gives the slope, so it determines the derivative, not the function value. First convert the tangent angles into .
Missing the substitution pattern in . This is of the form , so the correct substitution is , not .
Not changing the limits after substitution. Once is used, the bounds must be rewritten in terms of using and . Keeping the old -limits leads to an incorrect integral.
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