Kenny and Michael have scored points during a basketball game. Kenny has scored 13 points, and Michael has scored p points. Together they have scored a total of 27 points. Select the equation that matches this situation. Choose 1 answer: (A) 13-p=27 (B) 13+p=27 (C) 13=p+27

Kenny's Score: Kenny has scored 13 points. This is a fixed value and does not change.Michael's Score: Michael has scored p points. This is a variable that represents an unknown quantity.Total Score Calculation: Together, Kenny and Michael have scored a total of 27 points. This means that when we add Kenny's points to Michael's points, the sum should be 27.Equation Formulation: We need to find an equation that represents the situation. The equation should show that the sum of Kenny's points and Michael's points equals 27.Option (A) Evaluation: Option (A) suggests that if we subtract Michael's points from Kenny's points, we get 27. This does not match the situation because we are adding their points together, not subtracting them.Option (B) Evaluation: Option (B) suggests that if we add Kenny's points to Michael's points, we get 27. This matches the situation because we are looking for the sum of their points.Option (C) Evaluation: Option (C) suggests that Kenny's points are equal to Michael's points plus 27. This does not make sense because Kenny's points are a fixed number, 13, and cannot be equal to Michael's points plus another number.

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Kenny and Michael have scored points during a basketball game. Kenny has scored 13 points, and Michael has scored
p points.
Together they have scored a total of 27 points.
Select the equation that matches this situation.
Choose 1 answer:
(A)
13-p=27
(B)
13+p=27
(C)
13=p+27

Kenny and Michael have scored points during a basketball game. Kenny has scored $13$ points, and Michael has scored $p$ points. $\newline$ Together they have scored a total of $27$ points. $\newline$ Select the equation that matches this situation. $\newline$ Choose $1$ answer: $\newline$ (A) $13-p=27$ $\newline$ (B) $13+p=27$ $\newline$ (C) $13=p+27$

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Algebra 2

Write a linear inequality: word problems

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Q. Kenny and Michael have scored points during a basketball game. Kenny has scored

13

points, and Michael has scored

p

points.

\newline

Together they have scored a total of

27

points.

\newline

Select the equation that matches this situation.

\newline

Choose

1

answer:

\newline

(A)

13-p=27

\newline

(B)

13+p=27

\newline

(C)

13=p+27

Kenny's Score: Kenny has scored $13$ points. This is a fixed value and does not change.
Michael's Score: Michael has scored $p$ points. This is a variable that represents an unknown quantity.
Total Score Calculation: Together, Kenny and Michael have scored a total of $27$ points. This means that when we add Kenny's points to Michael's points, the sum should be $27$ .
Equation Formulation: We need to find an equation that represents the situation. The equation should show that the sum of Kenny's points and Michael's points equals $27$ .
Option (A) Evaluation: Option (A) suggests that if we subtract Michael's points from Kenny's points, we get $27$ . This does not match the situation because we are adding their points together, not subtracting them.
Option (B) Evaluation: Option (B) suggests that if we add Kenny's points to Michael's points, we get $27$ . This matches the situation because we are looking for the sum of their points.
Option (C) Evaluation: Option (C) suggests that Kenny's points are equal to Michael's points plus $27$ . This does not make sense because Kenny's points are a fixed number, $13$ , and cannot be equal to Michael's points plus another number.