The equation below does not have one solution, or no solutions, but instead it has an infinite number of solutions
<h3>How to determine whether the equation below has a one solutions, no solutions, or an infinite number of solutions?</h3>
The equation is given as:
x + 2 = 2 + x
Collect the like terms
x - x =2 - 2
Evaluate the like terms
0 = 0
An equation that has a solution of 0 = 0 has an infinite number of solutions
Possible values of x are x = 8 and x = -8
Hence, the equation below does not have one solution, or no solutions, but instead it has an infinite number of solutions
Read more about number of solutions at
brainly.com/question/24644930
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Answer:
4(2x+5x)
Step-by-step explanation:
Factor 4 out of 8x+20z
<em>Answer:</em>
<em>1 more than the product 9 and n.</em>
<em>Step-by-step explanation:</em>
<em>A number side by side indicate a product. So the answer phrase is:</em>
<em>1 more than the product 9 and n.</em>
<em>Hope this helped you!</em>
The answer to your question is 0
-6+2
--------- =
10-10
-4
---- =
0
m=0
*(the "-----" are supposed to be fractions, sorry if that looks confusing)*
y+2=0(x-10)
y+2=0
-2 -2
y=-2
Your answer would be "y=-2."
