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Question
4 match the scenarios given in the first column with the appropriate equation. j has 5 times the number of cookies than w. w has 5 fewer cookies than j. total number of cookies with j and w is 5. j has 5 more cookies than w drag & drop the answer j = 5 + w j + w = 5 w = j - 5 j = 5w show hint
for each match:
Scenario 1: J has 5 times the number of cookies than W.
To represent "5 times", we multiply W by 5 to get J. So the equation is \( J = 5W \).
Scenario 2: W has 5 fewer cookies than J.
"5 fewer" means we subtract 5 from J to get W. So the equation is \( W = J - 5 \).
Scenario 3: Total number of cookies with J and W is 5.
"Total" means we add J and W, and it equals 5. So the equation is \( J + W = 5 \).
Scenario 4: J has 5 more cookies than W.
"5 more" means we add 5 to W to get J. So the equation is \( J = 5 + W \).
Final Matches:
- J has 5 times the number of cookies than W: \( J = 5W \)
- W has 5 fewer cookies than J: \( W = J - 5 \)
- Total number of cookies with J and W is 5: \( J + W = 5 \)
- J has 5 more cookies than W: \( J = 5 + W \)
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for each match:
Scenario 1: J has 5 times the number of cookies than W.
To represent "5 times", we multiply W by 5 to get J. So the equation is \( J = 5W \).
Scenario 2: W has 5 fewer cookies than J.
"5 fewer" means we subtract 5 from J to get W. So the equation is \( W = J - 5 \).
Scenario 3: Total number of cookies with J and W is 5.
"Total" means we add J and W, and it equals 5. So the equation is \( J + W = 5 \).
Scenario 4: J has 5 more cookies than W.
"5 more" means we add 5 to W to get J. So the equation is \( J = 5 + W \).
Final Matches:
- J has 5 times the number of cookies than W: \( J = 5W \)
- W has 5 fewer cookies than J: \( W = J - 5 \)
- Total number of cookies with J and W is 5: \( J + W = 5 \)
- J has 5 more cookies than W: \( J = 5 + W \)