The Equations Of Three Lines Are Given Below Line 1 Line 2 Line 3 The equations of three lines are given below. line 1: 2y= 3x 7 3 line 2: y= =x 3 2 2* line 3: 4x 6y=6 for each pair of lines, determine whether they are parallel, perpendicul line 1 and line 2: parallel perpendicular o neither [ line 1 and line 3: o parallel o perpendicular perpendicular o neither line 2 and line 3: parallel perpendicular oneither. Let's write all three equations in the form y = ax b. line 1: y = line 2: y = 8 line 3: y = 1. now you see that line 1 and line 2 have the same slope, but they are not identical; they are different.
Solved The Equations Of Three Lines Are Given Below Line 1 3y 4x 5 To determine whether these **two **lines are parallel or perpendicular, we can convert line 2 into slope intercept form (y = mx b): 2y = 3x 5 y = (3 2)x 5 2. The equations of three lines are given below: line 1: y = 3 x − 7 line 2: y = 3 x 4 line 3: 2 x 6 y = 6 for each pair of lines, determine whether they are parallel, perpendicular, or neither. 1. line 1 and line 2: • parallel • perpendicular • neither 2. line 1 and line 3: • parallel • perpendicular • neither 3. line 2 and line. The equations of three lines are given below. line 1: y= 3x 7. line 2: 6x 2y=6. line 3: y= 3x 5. for each pair of lines, determine whether they are parallel, perpendicular, or neither. The slope of the first line is given by $m 1 = \frac{a 1}{b 1} = \frac{ 1.5}{ 1} = 1.5$. the slope of the second line is given by $m 2 = \frac{a 2}{b 2} = \frac{4}{ 6} = 0.667$. step 2: determine the relationship based on slopes.
The Equations Of Three Lines Are Given Below Line 1 Y 3x 5 Line 2 Y 3x The equations of three lines are given below. line 1: y= 3x 7. line 2: 6x 2y=6. line 3: y= 3x 5. for each pair of lines, determine whether they are parallel, perpendicular, or neither. The slope of the first line is given by $m 1 = \frac{a 1}{b 1} = \frac{ 1.5}{ 1} = 1.5$. the slope of the second line is given by $m 2 = \frac{a 2}{b 2} = \frac{4}{ 6} = 0.667$. step 2: determine the relationship based on slopes. Free line equation calculator find the equation of a line given two points, a slope, or intercept step by step. To find the slope of line 3, we need to rearrange the equation into the slope intercept form y = mx b. start with: 6x −2y = −8. solve for y: subtract 6x from both sides to get −2y = −6x − 8. the slope of line 3 is 3. now that we know the slopes: let's compare each pair: line 1 and line 2: slopes are 3 and −3, respectively. Question: the equations of three lines are given below. line 1: 6x 3y = 6 line 2: y= 2x 5 line 3: y= 2x 7 for each pair of lines, determine whether they are parallel, perpendicular, or neither. Enter a problem combine 1 2 1 2 and x x. create a graph to locate the intersection of the equations. the intersection of the system of equations is the solution. free math problem solver answers your algebra, geometry, trigonometry, calculus, and statistics homework questions with step by step explanations, just like a math tutor.