What number should both sides of the equation x_{t} = 0 be multiplied by to solve for the value of x?
To solve for the value of x, both sides of the equation x_t = 0 should be multiplied by any non-zero number. However, if you want to find the value of x that satisfies the equation, multiplying both sides by any number would not change the equation or help in finding the value of x.
To solve for the value of x in the equation x_t = 0, you do not need to multiply both sides of the equation by any number. Since the equation states that x_t is equal to 0, it means that x_t already has a value of 0. Therefore, x = 0.
To solve for the value of x in the equation x_{t} = 0, you need to isolate the variable x on one side of the equation. Since we want to get rid of the coefficient in front of x, we need to multiply both sides of the equation by the reciprocal of that coefficient.
However, in this case, the equation x_{t} = 0 already has a coefficient of 1 in front of x_t. Therefore, there is no need to multiply both sides of the equation by a number to isolate x. The equation is already solved for x, as x_t is equal to zero.
In general, if you have an equation like ax = b, where a and b are constants, and you want to solve for x, you would divide both sides of the equation by a. By doing so, you eliminate the coefficient in front of x and get the value of x alone on one side of the equation.