It means lines that do not Cross never.That is the definition :)
When a straight line equation is parallel to another equation the slope remains the same but the y intercept changes
Yes, x = -3 would represent a vertical line at abscissa -3, parallel to the y-axis.
The parallel lines represent scarification patterns.
The line that cuts a parallel line is called a TRANSVERSAL. When you have parallel lines and you want to show like corresponding, vertical, ect.... then the line that cut through the parallel lines is a TRANSVERSAL
Line a is parallel to line b, m, and . Find .
5
When a straight line equation is parallel to another equation the slope remains the same but the y intercept changes
Yes, x = -3 would represent a vertical line at abscissa -3, parallel to the y-axis.
The parallel lines represent scarification patterns.
[A Parallel line is a straight line, opposite to another, that do not intersect or meet.] Ie. Line 1 is Parallel to Line 2. ------------------------------------------------- <Line 1 ------------------------------------------------- <Line 2
The line that cuts a parallel line is called a TRANSVERSAL. When you have parallel lines and you want to show like corresponding, vertical, ect.... then the line that cut through the parallel lines is a TRANSVERSAL
Line a is parallel to line b, m, and . Find .
Do you mean "Why might a parallel line algorithm be needed?" or "What properties does a parallel line algorithm need to have?".
A vertical line has an undefined slope. For the line to be parallel to a vertical line, the slopes would have to be the same. Therefore, the line parallel to a vertical line also has an undefined slope.
A system of equations will have no solutions if the line they represent are parallel. Remember that the solution of a system of equations is physically represented by the intersection point of the two lines. If the lines don't intersect (parallel) then there can be no solution.
draw line st parallel to line mn
I classify a parallel line as two line segments that will never intersect if the line kept going. They are perfectly straight and even.