List some values for [math]x[/math] that would make this inequality true.
How are the solutions to the inequality [math]-3x\ge18[/math] different from the solutions to [math]-3x>18[/math]? Explain your reasoning.
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[/img][br]You had a coupon that made the price of a large pizza $13.00. For what percent off was the coupon?
Your friend purchased a medium pizza for $10.31 with a 30% off coupon. What is the price of a medium pizza without a coupon?
Your friend has a 15% off coupon and $10. What is the largest pizza that your friend can afford, and how much money will be left over after the purchase?
Select [b]all [/b]the stories that can be represented by the 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ON95ElfF5vYzlji7CogmZmZmDBuPLr9s6t6oHvpxSaQP+nsaEMKiLFEW9gfHx+P995+B/8aP0E97ezeFYMXnm8M6VegF7s8+dhFQDztIb/uyk1n+LAhyMnOxIFf96s5T+TBwLE4fuvV9rT62o4CIq8fI75aoD6a7/vvj7h3756yab8+fd0f5qxuPGf6KSAWN6TchM6fPYdQNRNYD/VRS7KUk5WNzh07qSGI5dWW583Kytm2i4BoG4htZEgIeeXR/Z9dce7cOXXo3t18dOnyAfr06qluRDq8XdZ2ExBp7X+3eo2aZsDYZ0eGq2/83PM4dOiQXUznygcFxIXCYh79SqO4BLt27cLwIUNx5LD73zpSmKX/wO3bty2WuYqTazcBkdz+9OM+DBowEL/89LPKvBb8Xdt3YMigwbh161bFUCx41G4CkpGRgWlTpmLWzDDHa0enTbKystSD3LYtWy1opYqTTAGpmI+pj8pNRj66XkxOUU+tJcVFrvTKMRGO06dPq6azviG5AljYYycBEbuIk3kVks6dV8PQuExTAuTl38GZ0ydx9679Bo20ooBUVI9kZGipby6x1w95AGRYE/mwbreFAmIxi0qZdCvEhkIqo5kbNl3h3MJbLL/ekmsnAfGWP899yqZGw3oGsOi2FQXEiNpbvfJmJm/hjPFY2U8Bsaj1vBXUcrMiwmKjuTLsKiBiI3e7Ovt/uO8s18xWO2B1ATHy1vVLr+WY0W8Mayc/BcRO1vSVF5vciOwqIA7z2etPq4qKpJ0EpKJ82vkYBcQmN1U7F1Jj3uSpTguITGmr+kgYA9BvGQJaQOwytYJlwPshofq2Kd911IyEziltrT6JVJRMwZuQ4ZjTPTED0ady1IRSrtF4lxintC3WGJxEPTb9wJlR+JtAifuEUnb8uOxvZGaKz/VapwRqxGGZHVRPaWumdDIt3gm47Oc8rFsgMiOhzIkuAmJ1EdEDKi48noElnsO5L4qKRoO69VxT2roBoYB4LzUm25t1K1NNadu61eu2/DvJZLhrJTlS7+bMmq2ml968cZPjGqx/tcK6NiNNTU1VnV1fbRusprSNPpGF6BOZZZwWFm/HzLRP0hl9vDT9i87exshl21D3mWccMxIuWbQY9Z6tg1UrViLndq7qtS2/38kvr3TWYCC/RL7cpClatngVaddv0G4WK7tS76SuSZ8JaYGs+HY5cnNzkXvHGuWP9wltpxycPHkSjRs1RIvWHTD35yTMi7uM8AOXDO4Kwg+IM+4zsT/uCsLjnOmLu4SII39g8MK1ePYvf3IISHRkFOrXrYdePXpi1oyZmDl9Bp3FGEyc8C8816ChGqrli4mTEDZjJsIslodALXdiK8m7rN95620lIDLfiWyzPpr/XuSqZzOmIWxaGMaNHYUGdRrgxSbN0HX4ZHQbPhndR0yytPtw5GR0G+nIQ9dRUxHSvZ9qdIwaMRJBsTG70Sm4oxrtVGYIE9exfQe1loEI6czPQOzVoW07lw07Ou2m17SheW0oNhIn9U5GHDbakXYzr92MtgnpEIJO7TspO4oN27d7U91DO3f6O0JCQgxOtrWT/dpv3rXkQaaPduTj7+jcuTPUvo7BamDMIOklKsOcy2CDMgTIzp071Vr8dNZgoGy3Yyd2bt+BmJ20oZXLrdhQ10Ur5yNQ065st32HunfGxMRg965YZU/ZL04e2LXfCus9u/Y40xuL2Bjtj8Ge3bFIT09HkP6gpD+e87udJsI1CZAACVRMQN035abpvHHa9v7plrHSvlkuAakYE4+SAAmQAAkENAFjNw+naAY9fPgQCcfiA2KYgYA2PjNPAiRAAjUhYBgCSqbMkO4DQTLhi3xNv59/r0zU+rVWmQPcQQIkQAIkEFAEtB7IWkZNOJ6QiKDCwkIMGzwE2bk5AQWDmSUBEiABEqgeAZnp9ffTZxAk82dIC+TShYuO70AeQ6BXL3qeRQIkQAIkYCcCugXy+PFjNalbWlqa4y8s6QF78OBBO+WVeSEBEiABEqgFAjk5OfhswEAU3H/gEJB169ZBBlXUClML12SUJEACJEACFiag9eHob0cgo1+guMQhIElJSRg6eAjkjywuJEACJEACJFAegYiICNfgu6ofiAjHuDFjEX/0mOscpTaG37ZcB+ghgUAh4NZ5qvKZ1k9qlT+DIUnA/ASkOsggn4M/G4Rr166pBLs6Eh74dT/Gjx2HwgcFFb7K0pVDr82fbaaQBEoJlCm3VRQJHVytnRs6TlkbXelV6SMBcxLQ5VVSZyzHnqnVx5Yt+waLIqNQVFSkgrgE5MGDB5g7dy7+8/Uy9W5LRegZC7dJwKYEdAWpSva0mFTlHIYlASsRkDKu68bBA3EYM2IErt247sqCS0Bkz42r19ScBMuWfo3s7GxXIKNHIhMnv/9qP9fuT57kYT4eUoaNdpHy67nI8cosrlDF3vMpcRivRb93TuRifi5SluW33V27YzD28zFIjE9wNTDkmBIQXSHEoH9cSVWtkOlTpmLntu1ITk5WYiIdDh89eqSaLnotzRg6MrByGdCCIWW/0oszqKykcun8s16wLuiyYPV1fn4+ZHbFn/f9hLmz56jZMkU8igofqv6Cur64CYiuQDJM7+HDh7F65Sos+PIrhM+Zi3lzw+nIwBZlQMqzuK/mf4mli5eoP0pSUlJ08fe5zsjIQGxsrHrQkjiMdYN1hfcJY3mwol/XD0m71A8REWlYiCiqxfCs5fYKy1hz5M8sqShXLl1G8vkknDl1WnVdl+7r4s6e+d1tW+/n2sGHHMzFwVt5PXn8BOL2H8B3q9dg+tRpkFe3mZmZ6vWTsS5ov7TCt27eglkzw/Dtf77Bvn37VJPeaGu5jnbG/fSbqzzQHmXtoeuIrGWwRBmd5MaNG5DxEstbyrZADOqiT5LmirwzpiMDq5cBeeWk8yBPVPLzSFZWFlKSktUMa19MmqyetqTsG6uCVCL5//3LefNx6sRJ3LyRpgYglddWEp+xjhivoa/FNeuOlcqAfkWlNUCv1X5DxSi3BaJP4JoEAoWAzM65ZdNmTBg3Hnm377iyLRVfmvLyuurq1avqu4frID0kEMAEKCABbHxmvZSAfrLKy8tDdGQUlixa7Dp46OD/MH7M56rVUd6TmSswPSQQQAQoIAFkbGa1LAFvgiA/kUhv2yuXUtWfh5+PGo1Dh34DoH/91euy8XEPCQQSAQpIIFmbeS2fgPO9rgiKOPlIvnLlcvWjyJjRY1FYcF/GjnN863D7OlJ+lDxCAnYnQAGxu4WZv2oRuHDhAiaOm4iIrxZgy8ZNrrlyqhUZTyIBmxKggNjUsMxW9QlIC0R+Yx8+bAg+6v4hLl26VBqZ4Q8UNkRKsdAXmAQoIIFpd+baF4ESYOq/p+Cdv7+FgoICX6F5nAQCkgAFJCDNzkx7JeDRupCBRXt+3EN993D72G4M5zUi7iSBwCBAAQkMOzOXvgh4EYX1a9dh0ICBvs7kcRIIWAIUkIA1PTPuIuAUD7dWBoC93/+ghi1xhROPhPUiNm5huEECAUKAAhIghmY2K0fAKCIyxImMSCqLcX/lYmIoErA/AQqI/W3MHFaSgNeGhfT9cJ5PEakkSAYLGAIUkIAxNTPqk4Czo6AxnBIN52srLSB6bQxHPwkEIgEKSCBanXl2IyCCIMOXnDt3Tg1jLUNZa5d09hzOnj2rRus1DrDoFgE3SCBACVBAAtTwzLY7gbVrvkPf3n3Qu1coQkND1Vr84np89DHef+ddfB+7x/0kbpFAgBOggAR4AWD2HQSupv6BY0eO4tixY24uISEB06ZMRf06dXHwQBxxkQAJGAhQQAww6A1cAvIay5uTiaS6dfkn3nv7HdzOyQ1cQMw5CXghQAHxAoW7SEAT2P/Lr3i+YSOsXrFS7+KaBEjASYACwqJAApqA/l/X2e9Dprwd+Gl/tH79Ddy8eVOH4poESMBJgALCokACBgL6NZbsOpF4HE1feBHzw+exI6GBEb0koAlQQDQJrknA0AIRGJMmTcJLTZpC5gYRYeFCAiTgToAC4s6DWySgxEL+ymr+cjOMGzNWTWsrWCgiLBwk4E6AAuLOg1skoAjMmDYdjRo0VJ0LPZFQSDyJcDtQCVBAAtXyzHe5BOSDeYtXmmPooMGQD+lGweCLrHKx8UAAEqCABKDRmeWKCchEUtJxMC6OHQcrJsWjgU6AAhLoJSDA8+/Wuigpwd27d9GhXXt079oNhQ84lW2AFw9m3wcBCogPQDwcAAQM76U2rt+A5xo0RMzOXQGQcWaRBGpGgAJSM34822YEft73E1Z8uxx5eXk2yxmzQwL+J0AB8T9TxmhBAvIqS1xhYSFk/CsuJEACvglQQHwzYggSIAESIAEvBCggXqBwFwmQAAmQgG8CFBDfjBiCBEiABEjACwEKiBco3EUCJEACJOCbwP8DzLgdpwiPEpEAAAAASUVORK5CYII=[/img]