For $2 x + 4 y = 10$ $2x+4y=10$ and $2 x + 4 y = - 10$ $2x+4y=-10$ , there is/are 1. 1 solution, 2. 2 solutions, 3. infinitely many solutions, 4. no solutions?

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For $2 x + 4 y = 10$ $2x+4y=10$ and $2 x + 4 y = - 10$ $2x+4y=-10$ , there is/are 1. 1 solution, 2. 2 solutions, 3. infinitely many solutions, 4. no solutions?

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Answer 1 · 2017-03-24T02:48:57

No solution - the lines are parallel

Explanation:

Let's graph the two of them and see what happens:

graph{(2x+4y-10)(2x+4y+10)=0 [-18.02, 18.02, -9.01, 9.01]}

They are parallel lines and so it's option 4 - no solution.

~~~~~~~~~~

Let's look at these equations a different way. I'm going to change them into slope-intercept form, where the general formula is:

$y = m x + b; m = slope, b = y -intercept$ $y=mx+b; m="slope", b=y"-intercept"$

$2 x + 4 y = 10 \Rightarrow y = - \frac{1}{2} + \frac{5}{2}$ $2x+4y=10=>y=-1/2+5/2$

$2 x + 4 y = - 10 \Rightarrow y = - \frac{1}{2} - \frac{5}{2}$ $2x+4y=-10=>y=-1/2-5/2$

And so we can see that the slope of these two lines is the same by the point where they intersect the $y$ $y$ axis is different, just as shown in the graph.

Answer 2 · 2017-03-24T11:40:47

4) There is no solution.

Explanation:

Just by looking at the given equations you should be able to see that there is a problem with the equations:

Both left sides of the equations are equal, but the right sides are not:

$2 x + 4 y = 10$ $color(red)(2x +4y) = color(lime)(10)$
$2 x + 4 y = - 10$ $color(red)(2x +4y)= color(magenta)(-10)$

It is not possible to add 2 identical terms and get different answers.

Mathematically:
If $2 x + 4 y = 2 x + 4 y$ $" "2x +4y = 2x+4y$

Then $10 = - 10 \leftarrow$ $" " 10= -10" "larr$ this is clearly false

This indicates that there is no solution for the system of equations.

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For $2 x + 4 y = 10$ $2x+4y=10$ and $2 x + 4 y = - 10$ $2x+4y=-10$ , there is/are 1. 1 solution, 2. 2 solutions, 3. infinitely many solutions, 4. no solutions?

2 Answers

Explanation:

Explanation:

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Science

Math

Humanities

... and beyond

For 2x+4y=102x+4y=10 and 2x+4y=−102x+4y=-10, there is/are 1. 1 solution, 2. 2 solutions, 3. infinitely many solutions, 4. no solutions?

2 Answers

Explanation:

Explanation:

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For $2 x + 4 y = 10$ $2x+4y=10$ and $2 x + 4 y = - 10$ $2x+4y=-10$ , there is/are 1. 1 solution, 2. 2 solutions, 3. infinitely many solutions, 4. no solutions?