When a straight line equation is parallel to another equation the slope remains the same but the y intercept changes
You are missing a - or + sign. The answer is 5/2 though. :)
1, it will have the same slope but the y intercept will be different.
Your answer can vary as long as it has a slope of 1. So it could be y=x+(insert number here)
The equation of a parallel line is of the form 2x - y = c for some c. (-3, -11) is on this lime so 2*(-3) - (-11) = c -6 + 11 = c so that c = 5 and therefore, the equation is 2x - y = 5
Rearranging the original equation, we get y=-(2/3)x+12. Since 12 is the constant, this is the point that the line of this equation will cut the y-axis if x=0. Therefore, -(2/3) is the gradient and for an equation to produce a parallel line, the gradient must be equal. Summing up, y=-(2/3)+c (where c equals any real number) would be parallel
The slope is 5. Parallel lines always have the same slope.
You are missing a - or + sign. The answer is 5/2 though. :)
1, it will have the same slope but the y intercept will be different.
y -4 = 3(x-3)y = 3x -5
Your answer can vary as long as it has a slope of 1. So it could be y=x+(insert number here)
2y= 3x+6
Any equation of the form 2x + 3y = c, where c is a constant value, represents a line parallel to the given line 2x + 3y = 12.
The equation of a parallel line is of the form 2x - y = c for some c. (-3, -11) is on this lime so 2*(-3) - (-11) = c -6 + 11 = c so that c = 5 and therefore, the equation is 2x - y = 5
Rearranging the original equation, we get y=-(2/3)x+12. Since 12 is the constant, this is the point that the line of this equation will cut the y-axis if x=0. Therefore, -(2/3) is the gradient and for an equation to produce a parallel line, the gradient must be equal. Summing up, y=-(2/3)+c (where c equals any real number) would be parallel
If you mean: y = 0.5x-10 then an equation parallel to it will have the same slope of 0.5 but a y intercept different to -10
It is the locus of all points whose coordinates satisfy the equation of the line.
A linear equation ?