Answer
A force is a push or pull upon an object resulting from the object's interaction with another object.
Explanation:
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D = 497.4x10⁻⁶m. The diameter of a mile of 24-gauge copper wire with resistance of 0.14 kΩ and resistivity of copper 1.7×10−8Ω⋅m is 497.4x10⁻⁶m.
In order to solve this problem we have to use the equation that relates resistance and resistivity:
R = ρL/A
Where ρ is the resistivity of the matter, the length of the wire, and A the area of the cross section of the wire.
If a mile of 24-gauge copper wire has a resistance of 0.14 kΩ and the resistivity of copper is 1.7×10⁻⁸ Ω⋅m. Determine the diameter of the wire.
First, we have to clear A from the equation R = ρL/A:
A = ρL/R
Substituting the values
A = [(1.7×10⁻⁸Ω⋅m)(1.6x10³m)]/(0.14x10³Ω)
A = 1.9x10⁻⁷m²
The area of a circle is given by A = πr² = π(D/2)² = πD²/4, to calculate the diameter D we have to clear D from the equation:
D = √4A/π
Substituting the value of A:
D = √4(1.9x10⁻⁷m²)/π
D = 497.4x10⁻⁶m
For a vertical spring launcher is attached to the top of a block and a ball is placed in the launcher, the position of the ball will be behind the box
<h3>What will be the position of the ball relative to the spring launcher?</h3>
Generally, the equation for the conservation of momentum principle is mathematically given as
(M+m) V1 = M*V2
Therefore, with the ball moving forward we have that; the ball at top it wii be behind the box,
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brainly.com/question/605631
Answer:
The speed of the vehicle moving along its descent path is .
Explanation:
It is given in the problem that a descent vehicle landing on the moon has a vertical velocity toward the surface of the moon of 37.7 m/s. At the same time, it has a horizontal velocity of 54.6 m/s.
The expression for the velocity of the vehicle moving along the descent path is as follows;
Here, is the vertical velocity of the vehicle landing on the surface of the moon and is the horizontal velocity of the vehicle landing on the surface of the moon.
Put and in the above expression.
Therefore, the speed of the vehicle moving along its descent path is .