Question**: A projectile is launched at an angle of 45 degrees with an initial speed of 20 m/s. What is the maximum height reached by the projectile? (Use \( g = 9.8 \, \textm/s^2 \)) - AMAZONAWS

Question: A projectile is launched at an angle of 45ÃÂ° with an initial speed of 20 m/s. What is the maximum height reached by the projectile? (Use ( g = 9.8 , \ ext{m/s}^2 ))

📅 March 6, 2026 👤 scraface

Mar 06, 2026

Question: A projectile is launched at an angle of 45ÃÂ° with an initial speed of 20 m/s. What is the maximum height reached by the projectile? (Use ( g = 9.8 , \ ext{m/s}^2 ))

Understanding Projectile Motion and Maximum Height

Understanding the Context

When a projectile is launched at an angle, its motion can be broken down into horizontal and vertical components. The maximum height is determined solely by the vertical motion, specifically the component of velocity perpendicular to the ground.

Given:
- Launch angle ( \ heta = 45^\circ )
- Initial speed ( v_0 = 20 , \ ext{m/s} )
- Acceleration due to gravity ( g = 9.8 , \ ext{m/s}^2 )

Step 1: Vertical Component of Initial Velocity

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Question Video: Calculating A Projectile's Initial Speed, 42% OFF

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Key Insights

Only the vertical component contributes to reaching maximum height. It is calculated using:

[
v_{y} = v_0 \sin \ heta
]

Substituting ( \ heta = 45^\circ ) and ( \sin 45^\circ = rac{\sqrt{2}}{2} ):

[
v_y = 20 \ imes rac{\sqrt{2}}{2} = 10\sqrt{2} pprox 14.14 , \ ext{m/s}
]

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Final Thoughts

Step 2: Use Kinematic Equation to Find Maximum Height

At maximum height, the vertical velocity becomes zero (( v_y = 0 )). Using the velocity equation:

[
v_y^2 = u_y^2 - 2gh_{\ ext{max}}
]

Where:
- ( v_y = 0 ) (at peak)
- ( u_y = 10\sqrt{2} , \ ext{m/s} )
- ( h_{\ ext{max}} ) is the maximum height

Rearranging:

[
0 = (10\sqrt{2})^2 - 2 \cdot 9.8 \cdot h_{\ ext{max}}
]

[
0 = 200 - 19.6 \cdot h_{\ ext{max}}
]

Solving for ( h_{\ ext{max}} ):

[
h_{\ ext{max}} = rac{200}{19.6} pprox 10.2 , \ ext{meters}
]