Let . If and are respectively the number of points at which the curves and intersect the x-axis, then the value of is:
- A
- B
- C
- D
Let . If and are respectively the number of points at which the curves and intersect the x-axis, then the value of is:
Correct answer:A
Standard Method
Given: .
Find: The value of , where is the number of x-intercepts of and is the number of x-intercepts of .
For the curve to intersect the x-axis, we set
So,
Hence,
Therefore, the curve intersects the x-axis at 2 points. So, .
Now differentiate:
For the curve to intersect the x-axis, set
Thus,
Therefore, the curve intersects the x-axis at 1 point. So, .
Hence,
So the mathematical working gives .
However, the solution concludes and the provided correct answer corresponds to option A. Since the source solution contains an internal discrepancy after the correct derivative-based calculation, the extracted answer is taken as A according to the solution's, while noting that the direct computation from the given question gives .
A common mistake is to confuse the x-intercepts of the curves with the points where the two curves intersect each other. Here, and count only intersections with the x-axis, so set each function equal to separately.
Students may differentiate incorrectly and write wrongly. For , the correct derivative is , not any expression involving exponentials.
Another mistake is to add extra points from curve-crossing analysis. The question does not ask where and intersect each other; it asks where each curve intersects the x-axis.
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