Answer:
a) 4.94263 m/s
b) 0.734 m
Explanation:
t = Time taken
u = Initial velocity
v = Final velocity
s = Displacement
g = Acceleration due to gravity
[tex]g=0.4\times 9.81\\\Rightarrow g=3.924\ m/s^2[/tex]
[tex]v^2-u^2=2as\\\Rightarrow v=\sqrt{2as+u^2}\\\Rightarrow v=\sqrt{2\times 3.924\times 2.7+1.8^2}\\\Rightarrow v=4.94263\ m/s[/tex]
The impact velocity of the rocket will be 4.94263 m/s
[tex]v^2-u^2=2as\\\Rightarrow s=\frac{v^2-u^2}{2a}\\\Rightarrow s=\frac{3^2-1.8^2}{2\times 3.924}\\\Rightarrow s=0.734\ m[/tex]
The maximum height the pilot could shut down the engines to ensure a safe landing at initial velocity 1.8 m/s and final velocity 3 m/s is 0.734 m
The velocity of the lander at impact is 4.94m/s
The maximum height the pilot could shut down the engines to ensure a safe landing is 0.735m
a) In order to get the velocity of the lander at impact, we will use Newton's law of motion expressed as:
[tex]v^2=u^2+2as[/tex]
v is the final velocity
u is the initial velocity
g is the acceleration due to gravity
s is the height of lander
Given the following parameters
u = 1.8m/s
g = 0.4 × 9.8 = 3.92m/s²
s = 2.7m
[tex]v^2=1.8^2+2(3.92)(2.7)\\v^2=3.24+21.168\\v^2=24.408\\v=\sqrt{24.408}\\v= 4.94m/s[/tex]
Hence the velocity of the lander at impact is 4.94m/s
b) To get the maximum height the pilot could shut down the engines to ensure a safe landing, we will use the formula:
[tex]v^2=u^2+2as\\3.0^2=1.8^2+2(3.92)s\\9.0-3.24=7.84s\\5.76=7.84s\\s=\frac{5.76}{7.84}\\s=0.735m[/tex]
Hence the maximum height the pilot could shut down the engines to ensure a safe landing is 0.735m
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