Question : For elevations which exceed or fall short of 45° by equal amounts, the ranges are equal”. Prove this statement.
Doubt by Yana and Shruti
Solution :
Case I :
θ1=45°+α
We know,
Range (R) = u²sin2θ/g
R1=u²sin2θ1/g
R1=u²sin2[45°+α]/g
R1=u²sin[90°+2α]/g
R1=u²(cos2α)/g [∵sin(90°+θ)=cosθ]
R1=u²(cos2α)/g — (1)
Case II :
θ1=45°-α
R2=u²sin2θ2/g
R2=u²sin2[45°-α]/g
θ1=45°-α
R2=u²sin2θ2/g
R2=u²sin2[45°-α]/g
R2=u²sin[90°-2α]/g
R2=u²(cos2α)/g [∵sin(90°-θ)=cosθ]
R2=u²(cos2α)/g — (2)
From (1) and (2), it is clear that when angle of elevations exceed or fall short of 45° by equal amounts, the ranges are equal.
Hence statment is proved successfully.