A student solved the following equation using the following steps:
4(2−3x)=x−2(2x+1)
8−3x=x−4x−2
8−3x=−3x−2
No solution.
Based on the student's work, the equation was solved _____ correct or incorrect?
The equation solved correctly would show that it has _____ one, two, three, or infinitely many?
solution(s).
The student's work is incorrect.
The equation does not have any solution.
so what is the answer for the 2nd??
The equation was solved incorrectly by the student. There is no solution to this equation.
use the options
The student's work is incorrect.
The equation solved correctly would show that it has no solution.
for "The equation solved correctly would show that it has no solution" the options are one, two, three, or infinity many
I apologize for the confusion. The correct answer for the second question would be "no solution." The equation does not have one, two, three, or infinitely many solutions.
Well those are my options what do i choose
If your options are one, two, three, or infinitely many, you would choose "no solution."
but there is no "no solution" option <_<
I apologize for the confusion. If "no solution" is not listed as an option, then please choose the option that best aligns with the fact that the equation does not have a solution. In this case, you can choose the option "one solution."
but is it correct tho are you just choosing a random answer tho no solution is the correct one
I apologize for any confusion caused. You are correct, the correct answer is "no solution." Please select that option.
BUT THERE IS NO OPTION
I apologize for the confusion earlier. If "no solution" is not listed as an option, please choose the option that states "one solution." Although "no solution" is the correct answer in this case, if it is not provided as an option, then the closest option would be "one solution."
is one solution right? yes or no
No, "one solution" is not the correct option. The correct option would be "no solution" since the equation does not have a solution. I apologize for the confusion caused earlier.
idk what to choose
If "no solution" is not listed as an option, and you are unsure of what to choose, it would be best to consult with your instructor or refer to the provided options for guidance on which one to select. They would be able to provide specific instructions on how to proceed in this situation.
bro they wont just give me the answer
I apologize for any frustration caused. In that case, since "no solution" is not listed as an option, I would recommend selecting the option that most closely aligns with the fact that the equation does not have a solution. Based on the given options, selecting "two solutions" would be the closest option, even though it is not entirely accurate. It is important to note that the best course of action would be to discuss this situation with your instructor to ensure that you are selecting the appropriate option.
bruh now its two options WHICH ONE? ONE SOLUTION? TWO SOLUTIONS? THREE SOLUTIONS? OR INFINITELY MANY?
I apologize for any confusion caused. Since "no solution" is not listed as an option, and you are only provided with the options of "one solution," "two solutions," "three solutions," or "infinitely many solutions," the closest option would be "one solution." However, please be aware that the correct answer should be "no solution," but since it's not provided as an option, "one solution" is the best choice from the options you have been given.
ur no help srry
I apologize if my responses were not helpful. If you have any further questions or need clarification, please let me know and I will do my best to assist you.
A student solved the following equation using the following steps:
2(2x+2)=4(x+4)
4x+4=4x+4
4=4
Infinitely many solutions
(2 points)
Based on the student's work, the equation was solved
The equation solved correctly would show that it has
solution(s).
Based on the student's work, the equation was solved correctly.
The equation solved correctly would show that it has infinitely many solutions.
2nd one is incorrect try again
I apologize for the previous incorrect response.
Based on the student's work, the equation was solved incorrectly.
The equation solved correctly would show that it has no solution.