The domain could be the real numbers, in which case, the range would be the non-negative real numbers.
The domain is what you choose it to be. You could, for example, choose the domain to be [3, 6.5] If the domain is the real numbers, the range is [-12.25, ∞).
The domain and the range depends on the context. For example, the domain and the range can be the whole of the complex field. Or I could define the domain as {-2, 1, 5} and then the range would be {0, 3, -21}. When either one of the range and domain is defined, the other is implied.
In the complex field, the domain and range are both the whole of the complex field.If restricted to real numbers, the domain is x >= 4 and y can be all real numbers >= 0 or all real numbers <= 0 [or some zigzagging pattern of that set].
3x - 12 = 10x - 15 - 6x -10 3x - 12 = 4x -25 3x + 13 = 4x 13 = 4x - 3x 13 = x None?
so, if 2 minus Ln times 3 minus x equals 0, then 2 minus Ln times 3 equals x, therefore 2 minus Ln equals x divided by three, so Ln + X/3 = 2 therefore, (Ln + [X/3]) = 1
The domain is what you choose it to be. You could, for example, choose the domain to be [3, 6.5] If the domain is the real numbers, the range is [-12.25, ∞).
x
The are under the curve on the domain (a,b) is equal to the integral of the function at b minus the integral of the function at a
Only if the domain (the numbers that you put into the function) are "bigger than or equal to zero". If the domain is "all real numbers",(i.e. including negatives) then it is not a one-to-one function. The question will tell you what the domain of the function (i.e. the values of 'x' that you are meant to input).
The domain is (-infinity, infinity) The range is (-3, infinity) and the asymptote is y = -3
Assuming the standard x and y axes, the range is the maximum value of y minus minimum value of y; and the domain is the maximum value of x minus minimum value of x.
If a equals 3 and b equals minus 5 then a minus b equals what
Find the maximum and minimum values that the function can take over all the values in the domain for the input. The range is the maximum minus the minimum.
-2, 1.74 and 0.46
The vertex is (5, 11).
All real number excluding x = 8
A cubic function, continuous, differentiable.