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For renting tables, Parties ‘R Us charges, C

, a $60 delivery fee and $4 per table, t
. Rob’s Rentals charges, C
, a $40 delivery fee and $6 per table, t
. Write the pair of linear equations that model this situation.(1 point)
Responses

Parties ‘R Us: C=60t+6
; Rob’s Rentals: C=40t+4
Parties ‘R Us: upper C equals 60 t plus 6 ; Rob’s Rentals: upper C equals 40 t plus 4

Parties ‘R Us: C=4t+40
; Rob’s Rentals: C=6t+60
Parties ‘R Us: upper C equals 4 t plus 40 ; Rob’s Rentals: upper C equals 6 t plus 60

Parties ‘R Us: C=4t+60
; Rob’s Rentals: C=6t+40
Parties ‘R Us: upper C equals 4 t plus 60 ; Rob’s Rentals: upper C equals 6 t plus 40

Parties ‘R Us: C=60t+4
; Rob’s Rentals: C=40t+6

1 answer

To model the situation of renting tables from Parties ‘R Us and Rob's Rentals, we need to formulate the linear equations based on the information given:

  1. Parties 'R Us:

    • Delivery fee: $60
    • Cost per table: $4 per table
    • Thus, the equation is: \[ C = 60 + 4t \]

  2. Rob’s Rentals:

    • Delivery fee: $40
    • Cost per table: $6 per table
    • Thus, the equation is: \[ C = 40 + 6t \]

Combining these, the pair of linear equations that model the situation is:

  • Parties 'R Us: \( C = 4t + 60 \)
  • Rob’s Rentals: \( C = 6t + 40 \)

So the correct choice is: Parties ‘R Us: C = 4t + 60; Rob’s Rentals: C = 6t + 40.