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Today, 19:51

2. The usual toll charge over the bridge is $1.50. If you purchase a special sticker for $10.50, the charge is only $0.80. At least how many trips over the bridge are needed before the sticker would cost less than the toll charge?

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  1. Today, 22:09
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    If you spend the $10.50, then every time you cross the bridge,

    you pay

    (1.50 - 0.80) = $0.70 less than if you had not spent the $10.50.

    So you need to cross the bridge (10.50/0.70) = 15 times before the savings

    add up to the $10.50.

    Check:

    14 crossings without the special sticker cost (14 x 1.5) = $21.00

    14 crossings with the special sticker cost (14 x 0.8) = $11.20

    Savings after 14 trips = ($21.00 - $11.20) = $9.80

    Still have not saved the $10.50 that bought you the cheaper crossings.

    15 crossings without the special sticker cost (15 x 1.5) = $22.50

    15 crossings with the special sticker cost (15 x 0.8) = $12.00

    Savings after 15 trips = ($22.50 - $12.00) = $10.50

    15 trips have saved the $10.50 that bought you the cheaper crossings. yay!

    You have now broken even.

    After this, you're 80¢ farther ahead for every future crossing.

    I suspect, however, that this is a monthly deal.

    If so, the extra $10.50 for cheaper crossings is a good deal only if you

    average crossing the bridge more than about every other day, all month,

    or roughly one round trip every 4 days during the whole month.
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