The range of a projectile projected at an angle of with the horizontal is . If the projectile is projected with the same velocity at an angle of with the horizontal, then its range will be:
- A
- B
- C
- D
The range of a projectile projected at an angle of with the horizontal is . If the projectile is projected with the same velocity at an angle of with the horizontal, then its range will be:
Correct answer:C
Standard Method
Given: Angle of projection in the first case is , range is , and in the second case . The initial velocity remains the same.
Find: The range at .
For projectile motion, the range is
So, for the two cases,
Substituting and ,
Using and ,
Hence,
Therefore, the range of the projectile is . The correct option is C.
Using direct substitution
Given: In the first case, at . In the second case, the projectile is projected at with the same velocity.
Find: The new range.
Using the range formula,
For ,
So,
Now for ,
Using ,
Therefore, the range at is . The listed the solution shows "The Correct Option is B", but the worked calculation gives , which matches option C.
Using instead of in the range formula is incorrect because projectile range depends on the double angle. Use .
Comparing the two cases without keeping the same initial velocity can lead to a wrong ratio. Here is unchanged, so only the sine factor changes.
Taking or is wrong. Use the correct standard values and before finding the ratio.
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