zero
If the first derivative if a function is a constant that the original function has only one slope across its entire domain, so it is a line.
The indefinite integral is the anti-derivative - so the question is, "What function has this given function as a derivative". And if you add a constant to a function, the derivative of the function doesn't change. Thus, for example, if the derivative is y' = 2x, the original function might be y = x squared. However, any function of the form y = x squared + c (for any constant c) also has the SAME derivative (2x in this case). Therefore, to completely specify all possible solutions, this constant should be added.
The integral of a given function between given integration limits will always be a constant. The integral of a given function between variable limits - for example, from 0 to x - can only be a constant if the function is equal to zero everywhere.
Yes.
work function = planck's constant x threshold frequency w=h(ft) it also equals the energy(eV) Planck's constant(h) = 6.626 x 10-34
No. Only a linear function has a constant rate of change.No. Only a linear function has a constant rate of change.No. Only a linear function has a constant rate of change.No. Only a linear function has a constant rate of change.
No but if you replace a constant with a function it will remain a formula
No but if you replace a constant with a function it will remain a formula
The PMT function.
If the first derivative if a function is a constant that the original function has only one slope across its entire domain, so it is a line.
No.
zero
Neither, by definition.
It will just be the gradient of the function, which should be constant in a linear function.
w=hf w-work funtion h-constant f-threshold frequency the work funtion is the minimum energy required to remove the electrons on the metal
When graphing functions, an inverse function will be symmetric to the original function about the line y = x. Since a constant function is simply a straight, horizontal line, its inverse would be a straight, vertical line. However, a vertical line is not a function. Therefore, constant functions do not have inverse functions. Another way of figuring this question can be achieved using the horizontal line test. Look at your original function on a graph. If any horizontal line intersects the graph of the original function more than once, the original function does not have an inverse. The constant function is a horizontal line. Under the assumptions of the horizontal line test, a horizontal line infinitely will cross the original function. Thus, the constant function does not have an inverse function.