x=0
Chat with our AI personalities
Any equation with the form y=c is parallel to the y-axis, where c is a constant.
It crosses the y axis at (0,6) and crosses the x axis at (-6,0). It is a straight line with a positive slope.
b represents the intercept on the y-axis
The y axis represents the vertical co-ordinates whereas the x axis represents the horizontal co-ordinates.
Y=mx+b. this equation is used for straight lines on a graph. Each letter represents something different. Y is the y-axis (the vertical lines of the graph). M is the slope. X is the x-axis (the horizontal lines of the graph). B is the y-intercepts (where the line intercepts with the y axis).
Any equation with the form y=c is parallel to the y-axis, where c is a constant.
x=4
[ y = plus or minus any number ] is parallel to the x-axis.
y intercept That is where the line crosses y axis at x = 0
It crosses the y axis at (0,6) and crosses the x axis at (-6,0). It is a straight line with a positive slope.
To determine the units of the y-intercept in a linear equation, you need to look at the units of the y-axis. The y-intercept represents the value of y when x is zero, so the units of the y-intercept will be the same as the units on the y-axis.
The y axis represents the vertical co-ordinates whereas the x axis represents the horizontal co-ordinates.
b represents the intercept on the y-axis
The equation y = -2.5 represents a horizontal line on the Cartesian plane passing through the point (-2.5, 0). This line is parallel to the x-axis and has a slope of 0. The solution to this equation is all real numbers on the y-axis that have a value of -2.5.
Assume the expression is: y = x² - 6x + 5 Complete the squares to get: y = x² - 6x + 9 + 5 - 9 = (x - 3)² - 4 By the vertex form: y = a(x - h)² + k where x = h is the axis of symmetry x = 3 is the axis of symmetry.
The one which shows a straight line with a positive gradient of 3 and crossing the y axis at 2.
The y axis represents the vertical co-ordinates whereas the x axis represents the horizontal co-ordinates.