Answer this question… What is the line of symmetry of the graph of the equation ? A. x = -2 B. x = -4 C. x = -16 D. x = -8
There is no equation (nor inequality) in the question so there can be no graph - with or without an axis of symmetry.
If it is a straight line, then the equation is linear.
yes
line or graph on a line in a math equation
Did you mean a parabola with equation y=3x^2? The line of symmetry is x=0 or the y-axis.
To determine the line of symmetry for the graph of the equation (y = 4x - 8), we need to identify the axis that divides the graph into two mirror-image halves. For linear equations like this one, the line of symmetry is typically vertical and can be found at the midpoint of the x-intercepts. In this case, since the graph is a straight line, it does not have a line of symmetry unless it is horizontal or vertical. Therefore, the concept of a line of symmetry does not apply to this linear equation.
There is no equation (nor inequality) in the question so there can be no graph - with or without an axis of symmetry.
The graph will be a line.
X=-b/2a
When it is a linear equation.
the line
the line of symmetry would occur at x=0
If it is a straight line, then the equation is linear.
This is a straight line graph with the equation, y = n where n is any positive or negative number.
When the equation of a line is parallel to another line the slope remains the same but the y intercept changes
Graph that equation. If the graph pass the horizontal line test, it is an inverse equation (because the graph of an inverse function is just a symmetry graph with respect to the line y= x of a graph of a one-to-one function). If it is given f(x) and g(x) as the inverse of f(x), check if g(f(x)) = x and f(g(x)) = x. If you show that g(f(x)) = x and f(g(x)) = x, then g(x) is the inverse of f(x).
To determine if a graph is symmetric with respect to the x-axis, check if replacing (y) with (-y) in the equation yields an equivalent equation. For y-axis symmetry, replace (x) with (-x) and see if the equation remains unchanged. For origin symmetry, replace both (x) with (-x) and (y) with (-y) and verify if the equation is still the same. If the equation holds true for any of these conditions, the graph exhibits the corresponding symmetry.