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Grade 11General Physics

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 will be the angle of projection in the above question ?

Profile image of rohit
6 Years agoGrade 11
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1 Answer

Profile image of Vikas TU
6 Years ago
Dear student 
usinQ /g = 2uSin(Q-30)/gcos30 
sinQ * 8.66 = 10SinQ - 20*0.866 * CosQ 
17.32 CosQ = 1.34 sinQ 
TanQ = 17.32/1.34
Q = Tan^-1(12.92) 
Good Luck