The kinematic equation can be used to calculate an object's motion when it moves with constant acceleration. The condition that must be met for it to be applicable is that the acceleration of the object remains constant throughout its motion.
The kinematic boundary condition on a free surface in fluid dynamics refers to the requirement that the velocity of the fluid particles at the surface must be equal to the velocity of the surface itself. This condition has important implications for understanding how fluids behave at boundaries, such as the formation of waves and ripples on the surface. It also helps in predicting the flow patterns and interactions between the fluid and the boundary.
To reach a height of 12m, the initial velocity of the ball when thrown upward must be at least 8 m/s, assuming no air resistance and disregarding other factors like wind, drag, etc. This calculation is based on the kinematic equation: (v^2 = u^2 + 2as), where (v) is the final velocity (0 m/s at the peak), (u) is the initial velocity, (a) is the acceleration due to gravity (-9.81 m/s(^2)), and (s) is the displacement (12m).
Nernst's distribution law is applicable for the partitioning of solutes between two immiscible solvents at equilibrium, where the solutes exist in only two forms (unionized and ionized). The solvents must not react with the solutes, and the temperature must remain constant throughout the process. Additionally, the solutes should not form complexes with the solvents.
The distance between the centers of the two objects must be squared in the equation for the gravitational force. This is represented by the r^2 term in the equation F = G * (m1 * m2) / r^2, where F is the force, G is the gravitational constant, m1 and m2 are the masses of the objects, and r is the distance between their centers.
The light bulb must be properly connected to a power source and the switch must be turned on. If these conditions are met and the bulb is not burnt out, it should turn on when electricity flows through it.
The kinematic boundary condition on a free surface in fluid dynamics refers to the requirement that the velocity of the fluid particles at the surface must be equal to the velocity of the surface itself. This condition has important implications for understanding how fluids behave at boundaries, such as the formation of waves and ripples on the surface. It also helps in predicting the flow patterns and interactions between the fluid and the boundary.
The equation must be written such that the right side is equal to zero. And the resulting equation must be a polynomial of degree 2.
He must be a Muslim ( this condition applicable only on president. pm may be non-muslim)
If the discriminant of the quadratic equation is less than zero then it has no real solutions
A condition that must be met is a requirement.
It depends on what the equation is!
Certain forms must be filled out by certain people when the circumstances for filling out those forms are applicable to those people. 2.Is the applacation applicable?
Every equation must contain a term! In fact it must contain at least two.
applicable work can begin
u must be gay
In an if statement, the condition must be enclosed in parentheses.
That must depend on the equation that has not been shown