1. 2(x-3)=2x

A. One solution
B. No solutions
C. Infinitely many solutions
2. 3(y-3)=2y-9+y
A. One solution
B. No solutions
C. Infinitely many solutions
3. 10x-2-6x=3x-2+x
A. One solution
B. No solutions
C. Infinitely many solutions
4. 4(x+3)+2x=x-8
A. One solution
B. No solutions
C. Infinitely many solutions

Help me with this please.

expand brackets or simplify for both sides then combine values for x (or y) and the integers.

if you end up with 0=0 answer is C
if you end up with 0=N answer is B
otherwise answer is A.
eg qu 2 gives
3y-9=3y-9 which gives 0=0 and is obviously true for any y
so answer here would be C.

All these are wrong guys don't use them :( they give u a 0

To solve these equations, we need to simplify and group like terms on both sides of the equation, then solve for the variable.

1. 2(x-3) = 2x
First, distribute the 2 to both terms inside the parentheses: 2x - 6 = 2x
Next, subtract 2x from both sides to eliminate the variable on one side: -6 = 0
This equation is inconsistent (the left side is a constant while the right side is zero) and has no solution.
Therefore, the answer is B. No solutions.

2. 3(y-3) = 2y-9+y
First, distribute the 3 to both terms inside the parentheses: 3y - 9 = 2y - 9 + y
Next, combine like terms on both sides: 3y - 9 = 3y - 9
The variable terms cancel out on both sides, resulting in -9 = -9.
This equation is consistent (both sides are equal regardless of the value of y) and has infinitely many solutions.
Therefore, the answer is C. Infinitely many solutions.

3. 10x-2-6x = 3x-2+x
First, combine like terms on both sides: 4x - 2 = 4x - 2
The variable terms cancel out on both sides, resulting in -2 = -2.
This equation is consistent (both sides are equal regardless of the value of x) and has infinitely many solutions.
Therefore, the answer is C. Infinitely many solutions.

4. 4(x+3) + 2x = x-8
First, distribute the 4 to the terms inside the parentheses: 4x + 12 + 2x = x - 8
Next, combine like terms on both sides: 6x + 12 = x - 8
Next, subtract x from both sides: 5x + 12 = -8
Next, subtract 12 from both sides: 5x = -20
Finally, divide both sides by 5 to solve for x: x = -4
This equation has one solution.
Therefore, the answer is A. One solution.