A linear equation with an undefined slope is an equation where, when graphed, forms a vertical line. For example: when given 2 points: (2, 4) (2,7) ~ The x-values are the same, while the y-values differ, which would create a vertical line when the points are graphed
Yes, graphed linear inequalities should be shaded to represent the solution set. The shading indicates all the points that satisfy the inequality. For example, if the inequality is (y > mx + b), the area above the line is shaded. If the inequality includes "less than or equal to" or "greater than or equal to," the line is typically solid; otherwise, it is dashed.
the "building blocks" of geometry(which are the point,line and plane)are so-called undefined because, technically,they can't be described without the aid of words which are undefined themselves.
the "building blocks" of geometry(which are the point,line and plane)are so-called undefined because, technically,they can't be described without the aid of words which are undefined themselves.
With great difficulty because a straight line equation must contain an equality sign in order for it to be graphed onto the Cartesian plane.
Any compound inequality, in one variable, can be graphed on the number line.
Yes. Those lines are examples of when an inequality (≥ or ≤) is graphed.
A linear equation with an undefined slope is an equation where, when graphed, forms a vertical line. For example: when given 2 points: (2, 4) (2,7) ~ The x-values are the same, while the y-values differ, which would create a vertical line when the points are graphed
The line must be solid if the inequality is strict (less than or greater than). It must be a dashed line if otherwise (less than or equal to, greater than or equal to).
To determine the inequality graphed on a number line, you would need to identify the points marked on the line and the direction of any arrows or shading. If the line is shaded to the left of a point (for example, -2) with an open circle, it represents the inequality ( x < -2 ). If it’s shaded to the right with a closed circle, it would indicate ( x \geq -2 ). Please provide specific details about the graph for a more precise answer.
Yes, graphed linear inequalities should be shaded to represent the solution set. The shading indicates all the points that satisfy the inequality. For example, if the inequality is (y > mx + b), the area above the line is shaded. If the inequality includes "less than or equal to" or "greater than or equal to," the line is typically solid; otherwise, it is dashed.
if the line slants down (from left to right) then it is negative. if the line slants up (from left to right) then it is positive. horisontal lines have a slope of "0" and and vertical ones are undefined.
the "building blocks" of geometry(which are the point,line and plane)are so-called undefined because, technically,they can't be described without the aid of words which are undefined themselves.
the "building blocks" of geometry(which are the point,line and plane)are so-called undefined because, technically,they can't be described without the aid of words which are undefined themselves.
It depends upon the inequality. All points on the line are those which are equal, thus:If the inequality is (strictly) "less than" () then the points on the line are not included; howeverif the inequality is "less than or equals" (≤) or "greater than or equals" (≥) then the points on the line are included.
It is a continuous function. If the line is a straight line, it is a linear function.
Answer t What is the slope of the line graphed below?his question…