Answer:
v₂ = 176.24 m/s
Explanation:
given,
angle of projectile = 45°
speed = v₁ = 150 m/s
for second trail
speed = v₂ = ?
angle of projectile = 37°
maximum height attained formula,
[tex]H_{max}= \dfrac{v^2 sin^2(\theta)}{g}[/tex]
now,
[tex]H_{max}= \dfrac{v_1^2 sin^2(\theta_1)}{g}[/tex]
[tex]H_{max}= \dfrac{v_2^2 sin^2(\theta_2)}{g}[/tex]
now, equating both the equations
[tex]\dfrac{v_2^2}{v_1^2}=\dfrac{sin^2(\theta_1)}{sin^2(\theta_2)}[/tex]
[tex]\dfrac{v_2^2}{150^2}=\dfrac{sin^2(45^0)}{sin^2(37^0)}[/tex]
v₂² = 31061.79
v₂ = 176.24 m/s
velocity of projectile would be equal to v₂ = 176.24 m/s
