Steeper
As the slope get closer to zero, the graph becomes close to horizontal.
When the value of the slope gets smaller, the graph of the line becomes less steep. A smaller slope indicates a more gradual increase or decrease, depending on whether the slope is positive or negative. If the slope approaches zero, the line becomes nearly horizontal. This change affects the rate of change of the dependent variable with respect to the independent variable.
The steepness of a graph is determined by its slope, which indicates how much the y-value changes for a given change in the x-value. A steeper slope means a greater change in y for every unit change in x, while a flatter slope indicates a smaller change. You can quantify the steepness by calculating the slope using the formula (change in y) / (change in x). In visual terms, the angle of the line with respect to the horizontal axis also reflects its steepness.
When the slope of a line reaches zero it then will be parallel to the x or y axes depending if its a positive or a negative slope.
It gets steeper.
the line goes down from left to right as the absolute value of the negative slope get bigger, the graph of the line gets steeper as the absolute value of the negative slope gets smaller, the graph of the line gets less steep ( apex )
Steeper
For a positive number, as the slope(y=mx+b where m is the slope) gets greater in value, the line gets steeper when plotted on a graph. For a negative number, as the slope(y=mx+b where m is the slope) gets greater in value, the line gets less steep when plotted on a graph.
For a positive number, as the slope(y=mx+b where m is the slope) gets greater in value, the line gets steeper when plotted on a graph. For a negative number, as the slope(y=mx+b where m is the slope) gets greater in value, the line gets less steep when plotted on a graph.
As the slope get closer to zero, the graph becomes close to horizontal.
A. As the absolute value of the negative slope gets bigger, the graph of the line gets steeper B. The line goes up from left to right C. As the absolute value of the negative slope gets smaller, the graph of the line gets less steep D. The line goes down from left to right E. The line shifts down
less steep (apex)
When the value of the slope gets smaller, the graph of the line becomes less steep. A smaller slope indicates a more gradual increase or decrease, depending on whether the slope is positive or negative. If the slope approaches zero, the line becomes nearly horizontal. This change affects the rate of change of the dependent variable with respect to the independent variable.
Not necessary because the line can have no slope at all and be as long as you want it to be.
The steepness of a graph is determined by its slope, which indicates how much the y-value changes for a given change in the x-value. A steeper slope means a greater change in y for every unit change in x, while a flatter slope indicates a smaller change. You can quantify the steepness by calculating the slope using the formula (change in y) / (change in x). In visual terms, the angle of the line with respect to the horizontal axis also reflects its steepness.
The graph passes through the point (0, B). Changing the value of m rotates the graph around that point. From left to right, the graph drops rapidly when m is a lery large negative number. The inclination decreases as m becomes a smaller negative number and is horizontal when m = 0. As m increases, the graph becomes increasing steeper upwards.