Question

Determine whether the statement is true or false.

Answer 1

The slope and intercept form of the equation of a straight line graph is $y = m \cdot x + c$

False: Graphs of two lines either intersect in one point or do not intersect. Thus graphs of two lines may have one point or no points in common

False: Graphs of two lines either intersect in one point or overlap. Thus graphs of two lines may have one point or an infinite number of points in common

Reason:

First statement;

Graphs of two lines either intersect in one point or do not intersect. Thus graphs of two lines may have one point or no points in common

The above statement is false; graphs of two lines may have an infinite number of points in common when they have the same slope and y-intercept

Second statement;

Graphs of two lines either intersect in one point or overlap. Thus graphs of two lines may have one point or an infinite number of points in common

The above statement is false; graphs of two lines that have the same slope but different y-intercept never intersect

Learn more about the number of solution of straight line graphs here:

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