(0,a)
y = x2 describes a parabolic curve with a focal point at the location 0, 0 and an infinite range greater than or equal to zero.
the midpoint of AB.
MATH 1003?
8.3
point
in general, the y-intercept of the function f(X)= axb^x is the point__.
Yes, the function y=4 will be a straight horizontal line, passing through the point y=4.
-.333
1y
The vertex is at the point (0, 4).
One point on a logarithmic graph is not sufficient to determine its parameters. It is, therefore, impossible to answer the question.
f(x) = x2 This describes a parabolic curve, with it's vertex at the point (0, 0)
It means that the value of the function at any point "x" is the same as the value of the function at the negative of "x". The graph of the function is thus symmetrical around the y-axis. Examples of such functions are the absolute value, the cosine function, and the function defined by y = x2.
Point function and path function are found in Thermodynamics.
An iterative approximation of a fixed point is a number, say x, that has been obtained through the use of an iterative method. x is called a fixed point of a function if and only if the function equals x when evaluated at x i.e. when f(x)=x.
Def. Scalar function. A scalar function is a function that assigns a real number (i.e. a scalar) to a set of real variables. Its general form isu = u(x1, x2, ... , xn)where x1, x2, ... , xn are real numbers.ORDef. Scalar point function. A scalar point function is a function that assigns a real number (i.e. a scalar) to each point of some region of space. If to each point (x, y, z) of a region R in space there is assigned a real number u = Φ(x, y, z), then Φ is called a scalar point function. Examples. 1. The temperature distribution within some body at a particular point in time. 2. The density distribution within some fluid at a particular point in time
If the graph of the function is a continuous line then the function is differentiable. Also if the graph suddenly make a deviation at any point then the function is not differentiable at that point . The slope of a tangent at any point of the graph gives the derivative of the function at that point.