graph x+4<5
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∙ 8y agoThe x-axis is the horizontal line on an x and y graph.
If an x-t graph is a position-time graph, velocity is the slope of the line on the graph.
It is the line obtained by joining the following points ----->>> (3,0) on x axis and (0,3) on y axis This line is tilted to 45 degrees from negative x axis.
The graph of the function y(x) = 1/x is a hyperbola.
X-45=12 ________ +45 +45 ________ x= 57
the graph is 2 straight lines from the origin in quadrants 1 and 2 at angle of 45 and 135 degrees from 0
I am assuming the you are talking about the graph of the derivative. The graph of the derivative of F(x) is the graph such that, for any x, the value of x on the graph of the derivative of F(x) is the slope at point x in F(x).
To translate the graph y = x to the graph of y = x - 6, shift the graph of y = x down 6 units.
The x-axis is the horizontal line on an x and y graph.
a line graph
If an x-t graph is a position-time graph, velocity is the slope of the line on the graph.
Take a blank graph with 'x' and 'y' axes on it. Draw a 45-degree line on the graph. The line goes through the origin, and from the origin, it goes down-left and up-right. The slope of the line is 1, and its equation is y=x. The region "y is greater than or equal to x" is every point on that line, plus every point on the side above it (to the left of it).
1 x 45 = 45 2 x 45 = 90 3 x 45 = 135 4 x 45 = 180 5 x 45 = 225 6 x 45 = 270 7 x 45 = 315 8 x 45 = 360 9 x 45 = 405 10 x 45 = 450 11 x 45 = 495 12 x 45 = 540
The graph of g(x) is the graph of f(x) shifted 6 units in the direction of positive x.
It is the line obtained by joining the following points ----->>> (3,0) on x axis and (0,3) on y axis This line is tilted to 45 degrees from negative x axis.
The first ten positive integer multiples of 45 are as follows: 1 x 45 = 45 2 x 45 = 90 3 x 45 = 135 4 x 45 = 180 5 x 45 = 225 6 x 45 = 270 7 x 45 = 315 8 x 45 = 360 9 x 45 = 405 10 x 45 = 450
An infinite number. Each point on the line y = x, that is, the line that goes at a 45 degree angle, from bottom left to top right.