The table below shows two equations:

Equation 1 |2x − 3| + 5 = 4
Equation 2 |5x + 3| − 10 = 3

Which statement is true about the solution to the two equations?
Equation 1 and equation 2 have no solutions.
Equation 1 has no solution and equation 2 has solutions x = 2, −3.2.
The solutions to equation 1 are x = 1, 2 and equation 2 has no solution.
The solutions to equation 1 are x = 1, 2 and equation 2 has solutions x = 2, −3.2.

Question

The table below shows two equations:


Equation 1	|2x − 3| + 5 = 4
Equation 2	|5x + 3| − 10 = 3


Which statement is true about the solution to the two equations?
 Equation 1 and equation 2 have no solutions.
 Equation 1 has no solution and equation 2 has solutions x = 2, −3.2.
 The solutions to equation 1 are x = 1, 2 and equation 2 has no solution.
 The solutions to equation 1 are x = 1, 2 and equation 2 has solutions x = 2, −3.2.

tkhunny · Answer

Have you considered finding the solutions?

The first, nearly by inspection, has no solutions.  You should be able to see this quickly.

Equation 1	|2x − 3| + 5 = 4

Subtract 5

Equation 1	|2x − 3| = -1

The Absolute Value is NEVER negative, so this one is done.  No solution.

You do the other one.

anonymous · Answer

The answer is C

anonymous · Answer

C: The solutions to equation 1 are x = 1, 2 and equation 2 has no solution.

tkhunny · Answer

OP Please ignore Heman.  Virtually all information so far offered is incorrect.

anonymous · Answer

what would it be #tkhummy

tkhunny · Answer

Asked and answered.  I gave you the solution to the first equation.  Your invitation to solve the second remains open.

anonymous · Answer

It is C stupid head

tkhunny · Answer

That's an interesting claim.  It may be logically sound.  If by "stupid head" you mean anyone who achieves an incorrect solution, then absolutely it's "C" or "D" or "A".  If, on the other hand, you wish for the correct solution, you should go with "B".