On earth the gravoitational force of a robotic helocopiter is 1.8 kilograms. wgat is the helocopiters gravitational force on mars
on earth g= 9.8 m/s ^2
on marsg=3.71 m/s^2
To calculate the helicopter's gravitational force on Mars, we can use the formula:
F = m * g
Where:
F = gravitational force
m = mass of the helicopter
g = acceleration due to gravity
Given:
Mass on Earth (m1) = 1.8 kilograms
Acceleration due to gravity on Earth (g1) = 9.8 m/s^2
Acceleration due to gravity on Mars (g2) = 3.71 m/s^2
To find the gravitational force on Mars (F2), we can set up the following equation:
F1 / m1 = F2 / m2
Rearranging the equation:
F2 = (F1 * m2) / m1
Now substitute the known values:
F2 = (1.8 kg * 3.71 m/s^2) / 9.8 m/s^2
Calculating:
F2 = 0.684 kg * 3.71 m/s^2 / 9.8 m/s^2
F2 = 0.684 * 0.3786
F2 = 0.2592 N
Therefore, the helicopter's gravitational force on Mars is approximately 0.2592 Newtons.
To find the helicopter's gravitational force on Mars, we can use the formula:
Weight = mass x gravitational acceleration
Given that the weight on Earth is 1.8 kilograms and the gravitational acceleration on Earth is 9.8 m/s^2, we can rearrange the formula to find the mass:
mass = weight / gravitational acceleration
Substituting the given values:
mass = 1.8 kg / 9.8 m/s^2
mass ≈ 0.1837 kg
Now, we can find the gravitational force on Mars using the mass and the gravitational acceleration on Mars (3.71 m/s^2):
Weight on Mars = mass x gravitational acceleration on Mars
Weight on Mars = 0.1837 kg x 3.71 m/s^2
Weight on Mars ≈ 0.681 kg
Therefore, the gravitational force of the helicopter on Mars is approximately 0.681 kilograms.
The helocopter's gravitational force on Mars would be 6.7 kilograms.
typo in the question. 1.8 kg is a MASS not a FORCE
Force on earth = 1.8 * 9.81 Newtons
so on Mars 1.8 * 9.81 * ( 3.71 /9.81) = 1.8 * 3.71 Newtons