Question
Harvest market sells a crate of 15 pounds of Florida apples for $12. The unit rate is $ per pounds is ________.
- 1 pound per $1
- 12 pounds per $1
- $0.80 per pound
- $0.33 per 1 pound
Hint:
The unitary method is a technique for solving a problem by first finding the value of a single unit, and then finding the necessary value by multiplying the single unit value.
The correct answer is: $0.80 per pound
Here, it is given that the cost of 15 pound Florida apples is $12.
We have to find the costs of 1 pound of apples.
Cost of 15 pounds = $12.
Cost of 1 pound = 12/15 = 0.80 $.
Hence, the correct option is C.
Cost per pound multiplied by total number of pound gives the total cost.
Related Questions to study
Analyze the table below and answer the questions that follow.
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text.](data:image/png;base64,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)
Find the unit rate of Burger king in $ per ounces.
Cost per ounce multiplied by total number of ounces gives the total cost.
Analyze the table below and answer the questions that follow.
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text.](data:image/png;base64,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)
Find the unit rate of Burger king in $ per ounces.
Cost per ounce multiplied by total number of ounces gives the total cost.
Analyze the table below and answer the questions that follow.
![Error converting from MathML to accessible text.](data:image/png;base64,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)
Find the unit rate of Wendy’s in ounces per $.
Number of ounces per dollar multiplied with total number of ounces gives the total cost.
Analyze the table below and answer the questions that follow.
![Error converting from MathML to accessible text.](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAARcAAABgCAYAAAA3gzYZAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAA1lpdWvQAADrZJREFUeNrtXX+EVdseX46MkcRIMpLIyMgYMcYYV8aQJBmJ5HqSxJXnetI/z/Ncz3M9rutJ+i9JRvK4xkhyXZIkuSJJMhK5ciWJPOPKcQzn7a/z3e/sWbPWXt/1Y8+cOfvzZd3b7LP32mt/1nd99netvff3o5RSbRQUFJQKSuc/MBgMltBALv3UkTDgDXKBwdmBN8gFBmeHAW+QC5wdBrw3Jbm0ewhsdK4fHqKVffRhJW0/kJX5rHziMs/bQC4gl768k6bA73Of9OHnCtt+OivPszKblQaXWd72NcgF5AJyqaaO9ibFTnoMRSdvsrLd8NsQ/3ag332yKnKZy8rTrLQYyK8sxxzLyrOsNLOykJVtvH2Wj6ftT7KyXzt2PCuPuP4PWbnk0ea24e89WbmZleWsrGi/Txfa+DYr5yx1093od96P6hr0OM++rDzMypeAqUpqcjmelSXGdon7smya5dv30jZ/xX1MeL7LyhnPdrpwDZ0aSva9lpXzJb/Tb9cDfZXsFPtikzHaE4Cfy1+jfbIqcrldYGYajK8Mx3zDjc/3O5uVq0w4xe1neHAXj33CzkWh5jD//XUEuSxxhw9ov41yJx4qAH7bUMdUVl5zJzf42i57nOeZZXCsN7lM8fWO8d9j/Pe0Rx2uvpe0+SCvUZxgPPdzvb7tdOFaVeTyG/ulzYZ5wIf4KhHLj1nZW8D4UQB+Ln+N9kkfcgldEGzw3UWvb4F/K1qTWV/fvqIdO2SILh5FkMuEZd+bDLyrjkUDuX3wOM8XwzVtBLksMGnrEcKdwHOa+l5yPLXjLwna6cK1KnJpee7j46uzAoxd+En8Ndon12vNxQTSoGW/QcfxbYsTf4kgF5t9sgCsH/NHVnZp25Y9znPCEn2tN7ksG6KqAc9rkZzPdfyyZb3Ct50uXDeSXJoJfbXtiZ/EX6N9sipy+Y7n2yuW6KbteZ62YJ9WBeTiU4cronNhvY3n4UvaGtN6kksstpK+l7Q59PeWJ65VTot2VzQtivVpqb9G+2QV5HKN54WDCUCSkgvdtd5X0BFfDFM00zH0SHNrIhL4m+o8rtyMkYuk7yVt/pQocnHhWhW5XLNMp1VhneR6heTiwk/ir9E+WQW5LCcESUou9E7BDcM6jU4MVz3J5Re1dpFwyHAMrc2cT0QCDWFYXdWay5whPF40RAgNy6BPMS26LlhzkbTThavtOmLxpgcBry0DfLta+yg61lfbnvhJ/DXaJ6sgl9eFhlNo+D0vFu1OSC53VfdJwTifc0Q7hhZ4z/K/6befmIR8yIWeXD3m+SkBfFR1H5EXjeqnpxVH+G9ayZ8PJAHC7uEGkcskX8eBArb0t/44+YVlLi7pe0mb9/G04STjvlu7eUjb6cL1RcCaghTvU1z/jOq+RHdYmV+ii/XVtid+En+N9skqyGWcAWzxQKTHXv/MysdE5LLMYeVbZnw61yHDMXtU912YB4UIxHd+ep6nXPn1TFru0JO8AEZteqXM74e45sB07M+q/DFmleRCdpxJosXXccKwzyz3Z0jfS9t8kOtY4UE6F9BOF66260iFd/76/3/5PDeV+eW5WF9tB+An8dcon8Tbrv62ix2gVwx9CLx7EiMA5ba7zPKK2fsuR05wdpALDOQSZTR3fqm6r/9fhLNj4MBALnB2GPAGucDg7MAb5AKDswNvmJBcoLOCgoISrVWEyAV3UhjwxrQIBmcH3iAXGJwdeMNALnB2GPAGufQT4G830NnR1yCXniMX2mfasc9RlS6rfPGDKfpAkD72GtmEzmX66Gx+ndtDeVWuqM6Hc7Qf5aehzxdmHHVSYiBK+vTC8jt9fbzA/dPi/f4Ecvm/Ha85CXmRi+tz619VNZIVO1TnU3TKf3GpD8jl9Dq3J8/r0eD9tjIJPHLUeUt1kh3Z6qbjKW1ArtZAX/qGpkTsN3IhTJZALnJyoW9rpiy/zyQE01YHfYn8gSOkzUwuw+vcnqbqJiFqV3itZHvZT+pOLrmsCMhFuCN9vPdzyV3sjKUul3aKT8dd4FBcDz9d2jU+Wi+hmjszPDVoKbu2kb7eEqMLI8WsmPu0anLJyazO5EL+8gBrM37kkjuqLo0xzYPQVJdLO8W344bV6iRNPho7Eq0XpcI0d0YZm7HCFGFBmbWNihajCyPFjDLpfYy4k/ocM81To7qSywBHbntBLv7kQnP1e9pv91U3PZ9el0s7JcSZW1r9Uo0didaLEu6jt/GGZa3BdS0xujA+56G1kzwT/1xF5DLIEd9XNSaXH7LybUTUV2tyIaO0guP87wme6tjm9C7tFF9n1rWJYjPVtwPbo2/7oNxaSyaL0YXxvY4x3q/pSfiSuoeY0I/UaeBoNm6I2kAunmCeK0QGdxxMnToMH9GmKan1i8hCNHdWIgZmqC5MCM75fn81RHyhde9jPxip28DR7KkBA5CLJ5gNXtfIRawbJWC6tFN8nZkeRV+pMHIJ1dxpKpm2UZn56sLEkMsWJX+Zr6zuUSbGrXUcOIZtoXLHIJeC/ZkH1EXHfi7tFB9n3slTsBFtzUWiXeMjgRkyLXpoWGvY4elUvrowseTyLrJuejXgJ65LgVyi9gO5aAPhmSFq8NVOkZxrK0dJtNajv4Am1a6Rkkuo5g49BbrP+zV4yvHE07l8dWGkTvwLr4XkL9E1eFr098i673HkokAuIJeU5OKzn0s7pSy8XOHBbdN6UUquXSNpb4zmzn5ee2gysRxUcr3eEF0Yaf8cKrSrzdHZD8I6XbrXdZ0CgFwSkgusP5y9CajWFe/aYwSg4Oww4A1ygcHZgTfIBQZnB94gFxicHQa8QS4wODvw3mTkAs0VFBQU6BbBcCcF3pgWweDswBvkAoOzw4A3yAUGZwfeIJeeu+i3NXV2DAqQS0+RCyVO2mnYbvqCd2wDBm47YP/5Gjl7iG4RfYl+NSt/qM73SPRl9W6MFyfehOljxoxwppQg+0AudqOcLKe0bZN83A5tO2Xnv7EJyOV0jcglRLeI+vBfqpOrhdJq0FfUT8EppXhTWotXPDYajB2l0aAv9neBXMxGuVhuatsoa9pHtVZhb4H373VyGa4RuYToFulfT8cksqoLuTyzRCm56gTIxWDbDVMd0mWhREr/0bYvG6KZPB1mk0lq0NJREk2hMm0gShL9m+EYGhjvC+2qSjuoV8klRLeIpkPbNAx/B6eU4m3Lo0zYPQe52O154W6/hUkk/39+V6RES7ra3hSHhXt4P5K4uGxohERTSKINdJ/D0qId5jWGYpv0O85cHzp7biG6RVfV6vSkpEf0b3BKKd5005owbN+rVitWgFw0u1xYpzhWiFgWefCSfctOWbRFtVY244OhERJNIYk20Hm1NsvavCqX7kilHdSr5KKUv27ROOPfYpKnPjsETinF+xRHzjPsv3m60+c1nVKKyeW46j5huczOSnahEIlQFHHCEF7vMkydJAMjRBtoSJv2DHAbBkquLZV2UC+Ti1Jy3SK6097mSDXHbYJxHQevlOI9w1PsJhdKYD6CyKXcilIULwvrIft52kNGjzq3Gk4gycUq6UCpNhBNjQ7yv8+qtYvRJkuhHdTr5FLcr0y3aNFCIrMqPIF4XcjFZLkSJcilxB7yHeyNYa5JIeGvhmM+K7emjZRcpNpANDX6vkA0PiqAMdpBm4lcynSLyvLsIgevP7nMFvwR5GKxf6hOFvkrhrUQWhQ1PW67qbpSHbHkItUGGuJoatiwvuOyzfrINaVu0ZIyqyceCMAT5NJ5X2g3yKXcZnjfY9r2k7zdFGaP8B3ySGE+Px9ILj7aQPeZ9K54AhKjHdSrzu6rW3SSCWZWdRcmZ7kfL4BXrHg/YOzydSryU5IGnqszRlJyyUXgtxjWK1rKrrw3ySRAayavDGD76DhLtYHyx66TQhBSaAf1KrmE6BadUt2nHPl7RyfAKaV4H+Yb0wpjTE9Ux+uOUT9+hEWk8wZhOtZMemBaBHLpM7vEISmcHQa8QS5JjdZcRuDsMOANcoHB2YE3yAUGZwfegADkAmeHAe8eIBdorqCgoEC3CIY7KfDGtAgGZwfeIBcYnB0GvEEuMDg78Aa5wHrE2dHXIJeeJJd8NZgSNVNKA0oqtBuDs+fbH6JbREYfidInFC8c/uBKBlYXcqkzHknIpWiUFvIpyKXn2x+iW0R2S3XSmbY3GRYbSS6wROTST1o27T5uf4hukaRukAvwqIxcKI/u8wAnbPOxlKWO8l7ouXFJxuIZDwpdm0iPnFx6SGXnsbVxiqcNA8JrIZNoLkmvKzW5hOgWgVxALhtCLnQXPMKDaCKQXMjhzxsG8CgPvFzGggTLbitzVjqJHpLtPLY25gJpQx7XItVcklxXFeQSolsEcgG5rDu55IWcdSzQCdvKLB6lOMr4RlCHVA9pwuPadqrOGtKwh1NJNZek11XVtM5Xt0jary2OCimDH+XQ2VZzcqkrHskiF4oCKKXfPbU6jZ8PudjskyVq0I+J0UOytfGBWqvGGHot7cDrqnLNSKpb5Fv3Fibx7ziaHK0pudQZj+RrLqNqdTLrFOTiU0eoHpKt/klea9lWAblUPbVIqVsU08Yjyv0Uqt/JpY54JCcXpVbnZE1BLl+UTJsoRg+pbN8pjsgGE5OG9LrWi1zKdIti29gEudQOj+Tk0uDpSW4rhgF01ZNcSAZjWts2ZDgmRg/JtS+d/45yS8f6kIv0utaTXN5VMJDGPEirDuRSFzySkgs9GSHdm6IGEYV/Z/nflL+WdHJPe5ILPdl4zOspRFRHVWeRVWf/GD0kibOQ+NqiMj/eDiEX6XVV4ey+ukXSuheZMBuFa6I+OVlTcqkzHknIJS80KG6p1YuUe5hgaMX8QeFO7bsWQhHJe67nKa+FLBv2C9VDkjrLDDvMlkRrKdLrSk0uIbpFen+b1rToEfwbxv8z30wm6zRwgEc6ctko28Vk1W+W8rqgW9S7ay4glx6yuwXGH+a/z/UB2FVeF5wd5AJyERiFly9V9zX5i30CdpXXBWcHuYBcYDAYyAUGg8GiyQUFBQUlafkfMVBEYktLiTcAAAJ7dEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG10YWJsZSBjb2x1bW5hbGlnbj0ibGVmdCIgY29sdW1ubGluZXM9InNvbGlkIiBmcmFtZT0ic29saWQiIHJvd2xpbmVzPSJzb2xpZCI+PG10cj48bXRkPjxtdGV4dD4mI3hBMDtIYW1idXJnZXJzJiN4QTA7PC9tdGV4dD48L210ZD48bXRkPjxtdGV4dD4mI3hBMDtUb3RhbCBjb3N0JiN4QTA7PC9tdGV4dD48L210ZD48bXRkPjxtdGV4dD4mI3hBMDtPdW5jZXMmI3hBMDs8L210ZXh0PjwvbXRkPjwvbXRyPjxtdHI+PG10ZD48bXRleHQ+JiN4QTA7TWMgRG9uYWxkJ3MmI3hBMDs8L210ZXh0PjwvbXRkPjxtdGQ+PG1vPiQ8L21vPjxtbj4xMjwvbW4+PC9tdGQ+PG10ZD48bW4+NDwvbW4+PC9tdGQ+PC9tdHI+PG10cj48bXRkPjxtdGV4dD4mI3hBMDtXZW5keSdzJiN4QTA7PC9tdGV4dD48L210ZD48bXRkPjxtbz4kPC9tbz48bW4+ODwvbW4+PC9tdGQ+PG10ZD48bW4+OTwvbW4+PC9tdGQ+PC9tdHI+PG10cj48bXRkPjxtdGV4dD4mI3hBMDtCdXJnZXIga2luZyYjeEEwOzwvbXRleHQ+PC9tdGQ+PG10ZD48bW8+JDwvbW8+PG1uPjE1PC9tbj48L210ZD48bXRkPjxtbj41PC9tbj48L210ZD48L210cj48L210YWJsZT48L21hdGg+Zgi3ZwAAAABJRU5ErkJggg==)
Find the unit rate of Wendy’s in ounces per $.
Number of ounces per dollar multiplied with total number of ounces gives the total cost.
Analyze the table below and answer the questions that follow.
![Error converting from MathML to accessible text.](data:image/png;base64,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)
Find the unit rate of Mc Donald’s in ounces per $.
Number of ounces per dollar multiplied with total number of ounces gives the total cost.
Analyze the table below and answer the questions that follow.
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text.](data:image/png;base64,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)
Find the unit rate of Mc Donald’s in ounces per $.
Number of ounces per dollar multiplied with total number of ounces gives the total cost.
If the weight of 7 books is 120 lbs. Weight of 28 books is ________.
We can find the weight by 28 books by multiplying the weight of 7 books by 4.
If the weight of 7 books is 120 lbs. Weight of 28 books is ________.
We can find the weight by 28 books by multiplying the weight of 7 books by 4.
Cost of 8 dozen of bananas is $10. Cost of 24 dozen of bananas is ___________.
We can multiply the cost of 8 dozen bananas by 3 and get the cost of 24 dozen bananas.
Cost of 8 dozen of bananas is $10. Cost of 24 dozen of bananas is ___________.
We can multiply the cost of 8 dozen bananas by 3 and get the cost of 24 dozen bananas.
Jenny packed 108 eggs in 9 cartons. At the same rate, 540 eggs can be packed in _________ cartons.
We can find the number of cartons required for 540 eggs by multiplying the number of cartons required for 108 eggs by 5.
Jenny packed 108 eggs in 9 cartons. At the same rate, 540 eggs can be packed in _________ cartons.
We can find the number of cartons required for 540 eggs by multiplying the number of cartons required for 108 eggs by 5.
George’s plane climbs 450 feet in 40 seconds. Altitude scaled by the plane keeping same speed in 4 minutes is ________.
We can also find the height scaled in 4 minutes by multiplying the height scaled in 40 seconds by 6.
George’s plane climbs 450 feet in 40 seconds. Altitude scaled by the plane keeping same speed in 4 minutes is ________.
We can also find the height scaled in 4 minutes by multiplying the height scaled in 40 seconds by 6.
Watson pours 36 fl.oz of grape juice equally into 9 cups. At the same rate 15 cups require _____________ fl.oz.
Watson pours 36 fl.oz of grape juice equally into 9 cups. At the same rate 15 cups require _____________ fl.oz.
Katrina and her friends ordered for 5 pizzas. If they are charged $40, cost of 9 pizzas at the same rate is __________.
Katrina and her friends ordered for 5 pizzas. If they are charged $40, cost of 9 pizzas at the same rate is __________.
Lilly bought 24 tennis balls packed equally in 8 sets. Determine the number of tennis balls in 10 such sets.
Lilly bought 24 tennis balls packed equally in 8 sets. Determine the number of tennis balls in 10 such sets.
Bill eats 3 slices of cornbread for breakfast that contain a total of 123 calories. 4 slices of cornbread contains _______________ calories.
Bill eats 3 slices of cornbread for breakfast that contain a total of 123 calories. 4 slices of cornbread contains _______________ calories.
Analyze the table below and answer the questions that follow.
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text.](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAVcAAABgCAYAAACpOTG5AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAA1lpdWvQAAD/xJREFUeNrtXX+EHlcXvl6xqqJERVREqRURay0RsVZE+ETViliqKiJiWRURlX8iIn98KsSnqvLHR0REVYSKFRWRf2JFRISIqLVWiIpVscqqiBivZb55Ome+d3pzZ+beeeedue/O83CSnXnv3Jk5c88z5/6Yc5RSKqRQKBRK5RL/QxAEQVQGkuuglEpQ3wTbJRsnjZ36JgiSK42doL4JkiuNnaC+CZJrTqHCWbE+0InkYiSrkXQjeRjJdB8GFHpu7IPWZ9sIyvba30VywqP7Hwadfx7Jy0jWPbneoeOBsOFG8X0kZyLZJDITyUJNSl3zwGiq0OfaBjH0tQFeO8rdj+QDkqs1XkWyuwEbqptcB8YDTZPr2wYbYuhBnaEH9+GLoYcDPCaUHtEFkmul1xhuAJ0NjAeaJle8Hacsz/lFJI8jCSJ5EMkOi+sLpdz1SN5IF0cVdMU/E+/5XYmuetX6BCEsyZAJ/j9cMMygA+WfyPEvMnRtc81TovNAntkxx+ss0mvZoZHQsdzdSD62aDPKsm0l7fKp6OZWJJtl/0HRPfY/imSnduy46BQ6ey09OBO+jmRF6rlu8L6z2njZNmX7PKoeziqyu6HjgabJdVa817ORjOScc1YMY5fsOyGKtVHqkhw/YnkvTzMaXN3kuk/FY15jsj0m25MOddxIde2gs8US1zwRyZ+RHFHxGPlOqdf1Oov0OmjPVQmh/Vghuc6JASY6Ph7JZSGA9P5jcv/pYx8J0UGnn8j214Y2sCzE0JHz/eDQxsu2qSY8V5v2MVQ80DS5Jm9SKOiPSE5lnPOGtq8jb14bpe5xvBe8qbZ4QK631PuTe9i+XfKctjozXcfpCq6zSK91kCvwUySjFZHrLdFrGvCorhj2r2vH6rqYNBDFvIFwXzu08bLPqglytWkfQ8UDVZNrP7PhaER/icu/VavTdiIidLjerN+OZHgRdZPrG8NbdkT2lz1nWOKacb6PKrjOIr3WRa7wAm9WRK5Z7bKovYYZL7932j706rYZ9F1Wb7bPqgpydeUCm/YxVDzgg+eqN7Bz2ps07IMowpL3gnGzq9KV2NkQuWb91nWoAxM4L1RvOU0Zci37e9dRr3WRK/BdJHsrIFeXawpLPtsiUqpijLpbUrdV80GZ9uEtD/hGrgnBBg0rNQGI/tmQeq7omn6pve3LkOufFXmuRXqtk1xhNHc8I9cRGRpLA8uEPqywzdXpufYDl/bhLQ/4SK4Y51ipQald9f64mLIc06mDXDE+dtjQVZm3vI83JXWmA2/u0xVcZ5FebZ5HVeQKfKviddX6b+uG67hcA7l+Fck1bR9mt2crbHMuz8qm3jLPzNbB6vahby94oGlyxRdZmPHbLts7xKOYq0Gpzy3GU9CwFxoiV3RbMZObzDiPy/aU5X0spwxzu3SFX6d0bXvNWJLySoioI8dfK3GdRXq1eR5Vkivu5a7hN0wqHZe/MfH1ixBf1eT6q+rN2o/L8xrVjhkVXR6S7U9VPCFXts25PCubess8MxuY2sfQ8UDT5Dopb81A9T5/nalJqViHuJpxTCgeDIzvk4bIFZgWo4NuFsXLsL2PcenK4Fist8QynH9LWddrnpA61qUxHi5xnUV6zbqPQZGryvBcd6je+tP7qrdMqUpyfSNORfJ5KZ7T/hxCfCTlFpV5rbMLbJ6Vbb1lnlneM8prH0PHAwx8US2oT+qbIEiuNHbqmyBIrjR2gvomSK40doL6JkiuBI2d+iYIkiuNnaC+ieEhV+YZp1AolP6Enis9KeqbIDgsQGMnqG+C5EqlUgXUN8F2ycZJY6e+CYLkuqGMnXonuRIk17+jB11UcXCDJLjK9JDd7DkPjB1xVZG/6S8ph6jziIx0wLLu6Zz6EfMTYfEQuR5BcO6p96NftYVcEYjjrugXunghev+YNk/4Rq7fqzgz5SYRRBLSw2+teXyjE3Kfuxom1yQuakfKgRCPKnOCNR0I7ryUU/81eQHi+SD48SUVR7FqI7kuSBsd0drAPdo84Ru5vh3y7tnPQj7XGibXQPWC8rrqC1kFZnOOCwy9jW5bGrEl3tDmCd/IFYGSpwoqyktAaJsnPS/3elHu9iygzmX5e0mZc5zXZezpPDwupADd3y847q14t2lyXSG5/h+fpdoBQXhDrrNivGdVdl70rHps86Tn5RW3yd2eN6RxUv7G//9p0NiRy361wAPVAV38puII9Hn1X1b/TMUyKffednJF5lQEpX4h+icIr8g18T4xNogEaqccGrltnvS8vOI2udtN2CxEnpA1xiN/1zy8uo19TvUysR62qO+Spu+s+selZ9CV5wT97G8xueq9qW9p74Sv5JrunmO2+3EkWy0aeb8ZTJMub1HudhOwQuCCtu+CeOBNdlPHpFyg8hP/gTAfWdQPr/aGitNQJLreIy+W8ZZ7rkh2iTQmmNw7QJsnfCZXJV3zc5r36ZpPqOtgJDa523VsEnLZYjC2F2owGStd9JmUO6uyl7WBEEYt6p/PIFEsSVpoQyO27MU8oc0TvpNrQrBBTZ6rTe52Hd+o/Og1sw0be6i9BFxeKvrLJcg5T0BybY0uiA1CrvAAVzRP1OQN2uZJz7sOm9ztOpDV8rOM3z6V330h11d91r9k8HABpE9+3YZGbIFx6bEQhFfkii+yMOOafPGDWfs7Kp6cSZCV+9s2T3reddjkbk/jCyH1PNxUg5k9zruPe3IPyUcEHRkWON9n/TNCsAelzo78/VI8+LaRKyb0vpQXV6ILTGQep80TvpHrpHiagep9/jqjlcnLX26b0z4PRbnbdePaW1DfHrmPOskVs/e3RY+hDI1cqqh+kMkz0XEgOjjSlkZs0PMd0QNkQQ3f59pEi4cFiP66qRz/q1ffBEFypbET1DdBciVo7NQ3QZBcaezUN0GQXGnsBPVNkFwJGjv1TRAmcmXOcQqFQulP6LnSk6K+CYLDAjR2gvomSK5UKlVAfRNsl2ycNHbqmyBIrhvK2Kl3kitBcv07shDSNiMwSxK4ZXpIbhCC0IgIHIPgM9sbNHYkVfxRxZkcUO5dJL+q/Aj5B0TfgZRHtK+sUIoIVvOLigPCBBZ1b3RyRTJIZJ54XlBHG/VGeEKuSHR3RsUh3CCIiKVHuF8bAsNDSMQnDRr7VRWndUlCDiIA+FEVR7AyAeEJF8X4O6L7WXlR6Glv5oQUkuyyH0ndD9vQiDPws+glr0xb9UZ4Qq5vh7R7Fho88G6Dxh6oXkBxG309zfBSEV4wncV2t5TlsIBbmTbrjfCEXBEpf8qi+52V2wpDCEtCbPj/cEYdCMJ9Xbpn6wavc0UI6rp0sV2NCvU/a9DYl1Ieko3e1zP2d7T7uKLMgcpJrvll2qw3whNynRXvFVHzRxwb8D4VR8Qfk+0x2Z40HL8k5xox1LEs5NiRrtwPDkbVkS42ut97GjR2ZD5YlXu00fvLjOtFJoZ3qW3o5hOSq3OZNuuN8IRcE+8T5PRHJKccGvAt9f7kF7ZvG47PIr55g4fx2vIGE1lNEXyTxj4nHmmo8rMpJN1/pCc5oHrpW6ZVL+NAerhhp+jpnfyG7u5RkmtumTbrjfCIXNPdc8x2P45kq0UDriL7K7zmbYZ6bY0K5/uXilN/jHtg7GNSDsZ9uqAsiHVB9VKWYFZ7VPNcQyFceMZJ3igM4yAh30mSa27a97bqjfCQXJNu9jnN+wwdG3bXwUiKgiTYGtUu9f4qhyaMPV3urHJf1obx5ifai8a0xGxCehok1+wXf1v1RnhKrgnBBjV5rljm9WFFhhd4YOzpcvCYXjqeA8kgv0tt31XmtOamlxjJlXojPCfXLSqevU83RlNDxZirPraIrKTzDkaC1QGzFRheR9ktK6ubXF85nuOi5nGhC/uVodwuNfh1vcNMrm3WG+EJuWJB9YmUQWPWHuOXc6ky+ArGtKxlr3hmu2V7XLanHIxkVI45JNuYLf/J0ahwzHnL4wZl7PfkHpKPCDoyLHA+o/x9FX+wkXj+0P8Fw8sKvz+QF9Am2YcVFr+peKyZ5GpGm/VGeEKuk+JpBqr3+euMoau6qrLXuS7LsYviuboaCUj6kYpn2hdV8Ux7UmciuPafxeNuytj3q3icOpByGBq5lFMeBr4g94yyN1X2hBwmF6+KZ74upLG/LY3Y4vlnjdO3VW+Ex8MCRH/DAgFVVau+CYLkSmMnqG+C5ErQ2KlvgiC50tipb4IgudLYCeqbILkSNHbqmyBM5Mqc4xQKhdKf0HOlJ0V9EwSHBWjsBPVNkFypVKqA+ibYLtk4aezUN0GQXDeUsVPvJFeC5Pp39CaEuUNgliRwy/SQ3CSiYSE1eJIgEVHmEQv14waMHUGuf1RxJgeUQzYBpHU+kFOXzcwkgJTQ/1VxqDzIFdnXZnJFChdEEXtuWdc0yZqom1xBTmdUHJYNgohYekT/NQ9vEJGzkBPpc9WLNYuEdAgxd68BY0f0pdOqF3IQAcCRr+mB4zm+lLrSuK/+GSlsWva1mVwRBW3Oso1vlhcwyZWolVzf9tnImwDixyIG7BaPjD1IkXxZfW2TnsMHGtleNpSFl/x1GxpxBWWuKPusvARRGbkiUv5UQUV5MTOnU93yJWWOxYrjEIQbWQcQu3Rd+x0ksSIEdV0jlyxjOemZsS9JV7UfcsUwwoS2D9keDhnKHpTfSK75mEp5+SRXolZynRXvFVHzRxwb8D7xIJO01mOyPWk4fknONWKoY1nItyNdvR8sXgjbPTN2ZBld7cND+kbFY4g61jKey4icj+SaDegImQc+JbkSTZBr4n1ibBBZMU85NOBb6v3JL2zfNhy/J6OOeUP39nXB9XY9NfY58cpDZZdNIQGMHxNVmwy/rXuoh2Eh10taeya5ErWTa7p7jtnuxypOkVHUKKvI/gqveZuh3mEk18R7T1LPnLas94F085UjuQZtaMQlyyBlzqMS9RHEQMhVSdf8nOZ9ho4Nu+vQqG2WIulYkmEEH409Xe6sKl7Whgmruzm/r2YMC3zAYYHcMugJjJJcCZ/INSHYoCbPFWOKHzpe3/cOXmGT5Ipu/ssCPWO8eSKnDIZePjfsP6Q4oVX04rddR0wQtZErljitaJ5oJ8Pw9bFFZH+ddzASrA6Ydbw+eK2/q3hdq+/k+iqn3BFVvA4W646vZuiNS7Hc2jhJlaiVXLGu8oTqzb6DuO6oeHImwfMMQ94rntlu2R6X7SmHRj0qxyTLjTC585PFdc8IwR5Lec/bZPthA8Z+T+4h+YigI8MC53OOuSm6LwI+6vhWyHpE6nzQlkZMciWGlVwnxdMMVO/z1xmtDCZbVlX2OtdlOXZRvDHXRg2SxuTDutRhO9M+Id7zGzkHhhhuqPx1u4My9v0qHqcOpByu6VJBfavK7kMIlLkmdeOzWqzz3dxyci3T1Se5Eo0PCxD9GWdAVdWqb4IgudLYCeqbILkSNHbqmyBIrgRBECRXgiCIISdXCoVCoVQo/wMyqkfKYpHntgAAAoB0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bXRhYmxlIGNvbHVtbmFsaWduPSJsZWZ0IiBjb2x1bW5saW5lcz0ic29saWQiIGZyYW1lPSJzb2xpZCIgcm93bGluZXM9InNvbGlkIj48bXRyPjxtdGQ+PG10ZXh0PiYjeEEwO1QtU2hpcnRzJiN4QTA7PC9tdGV4dD48L210ZD48bXRkPjxtdGV4dD4mI3hBMDtUb3RhbCBjb3N0JiN4QTA7PC9tdGV4dD48L210ZD48bXRkPjxtdGV4dD4mI3hBMDtOdW1iZXIgb2YgdC1zaGlydHMmI3hBMDs8L210ZXh0PjwvbXRkPjwvbXRyPjxtdHI+PG10ZD48bXRleHQ+JiN4QTA7U3RvcmUgQSYjeEEwOzwvbXRleHQ+PC9tdGQ+PG10ZD48bW8+JDwvbW8+PG1uPjQ4PC9tbj48L210ZD48bXRkPjxtbj4zPC9tbj48L210ZD48L210cj48bXRyPjxtdGQ+PG10ZXh0PiYjeEEwO1N0b3JlIEImI3hBMDs8L210ZXh0PjwvbXRkPjxtdGQ+PG1vPiQ8L21vPjxtbj45NjwvbW4+PC9tdGQ+PG10ZD48bW4+MTY8L21uPjwvbXRkPjwvbXRyPjxtdHI+PG10ZD48bXRleHQ+JiN4QTA7U3RvcmUgQyYjeEEwOzwvbXRleHQ+PC9tdGQ+PG10ZD48bW8+JDwvbW8+PG1uPjcwPC9tbj48L210ZD48bXRkPjxtbj4xNDwvbW4+PC9tdGQ+PC9tdHI+PC9tdGFibGU+PC9tYXRoPrb/zHYAAAAASUVORK5CYII=)
Find the unit rate of store C in shirt per $.
Analyze the table below and answer the questions that follow.
![Error converting from MathML to accessible text.](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAVcAAABgCAYAAACpOTG5AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAA1lpdWvQAAD/xJREFUeNrtXX+EHlcXvl6xqqJERVREqRURay0RsVZE+ETViliqKiJiWRURlX8iIn98KsSnqvLHR0REVYSKFRWRf2JFRISIqLVWiIpVscqqiBivZb55Ome+d3pzZ+beeeedue/O83CSnXnv3Jk5c88z5/6Yc5RSKqRQKBRK5RL/QxAEQVQGkuuglEpQ3wTbJRsnjZ36JgiSK42doL4JkiuNnaC+CZJrTqHCWbE+0InkYiSrkXQjeRjJdB8GFHpu7IPWZ9sIyvba30VywqP7Hwadfx7Jy0jWPbneoeOBsOFG8X0kZyLZJDITyUJNSl3zwGiq0OfaBjH0tQFeO8rdj+QDkqs1XkWyuwEbqptcB8YDTZPr2wYbYuhBnaEH9+GLoYcDPCaUHtEFkmul1xhuAJ0NjAeaJle8Hacsz/lFJI8jCSJ5EMkOi+sLpdz1SN5IF0cVdMU/E+/5XYmuetX6BCEsyZAJ/j9cMMygA+WfyPEvMnRtc81TovNAntkxx+ss0mvZoZHQsdzdSD62aDPKsm0l7fKp6OZWJJtl/0HRPfY/imSnduy46BQ6ey09OBO+jmRF6rlu8L6z2njZNmX7PKoeziqyu6HjgabJdVa817ORjOScc1YMY5fsOyGKtVHqkhw/YnkvTzMaXN3kuk/FY15jsj0m25MOddxIde2gs8US1zwRyZ+RHFHxGPlOqdf1Oov0OmjPVQmh/Vghuc6JASY6Ph7JZSGA9P5jcv/pYx8J0UGnn8j214Y2sCzE0JHz/eDQxsu2qSY8V5v2MVQ80DS5Jm9SKOiPSE5lnPOGtq8jb14bpe5xvBe8qbZ4QK631PuTe9i+XfKctjozXcfpCq6zSK91kCvwUySjFZHrLdFrGvCorhj2r2vH6rqYNBDFvIFwXzu08bLPqglytWkfQ8UDVZNrP7PhaER/icu/VavTdiIidLjerN+OZHgRdZPrG8NbdkT2lz1nWOKacb6PKrjOIr3WRa7wAm9WRK5Z7bKovYYZL7932j706rYZ9F1Wb7bPqgpydeUCm/YxVDzgg+eqN7Bz2ps07IMowpL3gnGzq9KV2NkQuWb91nWoAxM4L1RvOU0Zci37e9dRr3WRK/BdJHsrIFeXawpLPtsiUqpijLpbUrdV80GZ9uEtD/hGrgnBBg0rNQGI/tmQeq7omn6pve3LkOufFXmuRXqtk1xhNHc8I9cRGRpLA8uEPqywzdXpufYDl/bhLQ/4SK4Y51ipQald9f64mLIc06mDXDE+dtjQVZm3vI83JXWmA2/u0xVcZ5FebZ5HVeQKfKviddX6b+uG67hcA7l+Fck1bR9mt2crbHMuz8qm3jLPzNbB6vahby94oGlyxRdZmPHbLts7xKOYq0Gpzy3GU9CwFxoiV3RbMZObzDiPy/aU5X0spwxzu3SFX6d0bXvNWJLySoioI8dfK3GdRXq1eR5Vkivu5a7hN0wqHZe/MfH1ixBf1eT6q+rN2o/L8xrVjhkVXR6S7U9VPCFXts25PCubess8MxuY2sfQ8UDT5Dopb81A9T5/nalJqViHuJpxTCgeDIzvk4bIFZgWo4NuFsXLsL2PcenK4Fist8QynH9LWddrnpA61qUxHi5xnUV6zbqPQZGryvBcd6je+tP7qrdMqUpyfSNORfJ5KZ7T/hxCfCTlFpV5rbMLbJ6Vbb1lnlneM8prH0PHAwx8US2oT+qbIEiuNHbqmyBIrjR2gvomSK40doL6JkiuBI2d+iYIkiuNnaC+ieEhV+YZp1AolP6Enis9KeqbIDgsQGMnqG+C5EqlUgXUN8F2ycZJY6e+CYLkuqGMnXonuRIk17+jB11UcXCDJLjK9JDd7DkPjB1xVZG/6S8ph6jziIx0wLLu6Zz6EfMTYfEQuR5BcO6p96NftYVcEYjjrugXunghev+YNk/4Rq7fqzgz5SYRRBLSw2+teXyjE3Kfuxom1yQuakfKgRCPKnOCNR0I7ryUU/81eQHi+SD48SUVR7FqI7kuSBsd0drAPdo84Ru5vh3y7tnPQj7XGibXQPWC8rrqC1kFZnOOCwy9jW5bGrEl3tDmCd/IFYGSpwoqyktAaJsnPS/3elHu9iygzmX5e0mZc5zXZezpPDwupADd3y847q14t2lyXSG5/h+fpdoBQXhDrrNivGdVdl70rHps86Tn5RW3yd2eN6RxUv7G//9p0NiRy361wAPVAV38puII9Hn1X1b/TMUyKffednJF5lQEpX4h+icIr8g18T4xNogEaqccGrltnvS8vOI2udtN2CxEnpA1xiN/1zy8uo19TvUysR62qO+Spu+s+selZ9CV5wT97G8xueq9qW9p74Sv5JrunmO2+3EkWy0aeb8ZTJMub1HudhOwQuCCtu+CeOBNdlPHpFyg8hP/gTAfWdQPr/aGitNQJLreIy+W8ZZ7rkh2iTQmmNw7QJsnfCZXJV3zc5r36ZpPqOtgJDa523VsEnLZYjC2F2owGStd9JmUO6uyl7WBEEYt6p/PIFEsSVpoQyO27MU8oc0TvpNrQrBBTZ6rTe52Hd+o/Og1sw0be6i9BFxeKvrLJcg5T0BybY0uiA1CrvAAVzRP1OQN2uZJz7sOm9ztOpDV8rOM3z6V330h11d91r9k8HABpE9+3YZGbIFx6bEQhFfkii+yMOOafPGDWfs7Kp6cSZCV+9s2T3reddjkbk/jCyH1PNxUg5k9zruPe3IPyUcEHRkWON9n/TNCsAelzo78/VI8+LaRKyb0vpQXV6ILTGQep80TvpHrpHiagep9/jqjlcnLX26b0z4PRbnbdePaW1DfHrmPOskVs/e3RY+hDI1cqqh+kMkz0XEgOjjSlkZs0PMd0QNkQQ3f59pEi4cFiP66qRz/q1ffBEFypbET1DdBciVo7NQ3QZBcaezUN0GQXGnsBPVNkFwJGjv1TRAmcmXOcQqFQulP6LnSk6K+CYLDAjR2gvomSK5UKlVAfRNsl2ycNHbqmyBIrhvK2Kl3kitBcv07shDSNiMwSxK4ZXpIbhCC0IgIHIPgM9sbNHYkVfxRxZkcUO5dJL+q/Aj5B0TfgZRHtK+sUIoIVvOLigPCBBZ1b3RyRTJIZJ54XlBHG/VGeEKuSHR3RsUh3CCIiKVHuF8bAsNDSMQnDRr7VRWndUlCDiIA+FEVR7AyAeEJF8X4O6L7WXlR6Glv5oQUkuyyH0ndD9vQiDPws+glr0xb9UZ4Qq5vh7R7Fho88G6Dxh6oXkBxG309zfBSEV4wncV2t5TlsIBbmTbrjfCEXBEpf8qi+52V2wpDCEtCbPj/cEYdCMJ9Xbpn6wavc0UI6rp0sV2NCvU/a9DYl1Ieko3e1zP2d7T7uKLMgcpJrvll2qw3whNynRXvFVHzRxwb8D4VR8Qfk+0x2Z40HL8k5xox1LEs5NiRrtwPDkbVkS42ut97GjR2ZD5YlXu00fvLjOtFJoZ3qW3o5hOSq3OZNuuN8IRcE+8T5PRHJKccGvAt9f7kF7ZvG47PIr55g4fx2vIGE1lNEXyTxj4nHmmo8rMpJN1/pCc5oHrpW6ZVL+NAerhhp+jpnfyG7u5RkmtumTbrjfCIXNPdc8x2P45kq0UDriL7K7zmbYZ6bY0K5/uXilN/jHtg7GNSDsZ9uqAsiHVB9VKWYFZ7VPNcQyFceMZJ3igM4yAh30mSa27a97bqjfCQXJNu9jnN+wwdG3bXwUiKgiTYGtUu9f4qhyaMPV3urHJf1obx5ifai8a0xGxCehok1+wXf1v1RnhKrgnBBjV5rljm9WFFhhd4YOzpcvCYXjqeA8kgv0tt31XmtOamlxjJlXojPCfXLSqevU83RlNDxZirPraIrKTzDkaC1QGzFRheR9ktK6ubXF85nuOi5nGhC/uVodwuNfh1vcNMrm3WG+EJuWJB9YmUQWPWHuOXc6ky+ArGtKxlr3hmu2V7XLanHIxkVI45JNuYLf/J0ahwzHnL4wZl7PfkHpKPCDoyLHA+o/x9FX+wkXj+0P8Fw8sKvz+QF9Am2YcVFr+peKyZ5GpGm/VGeEKuk+JpBqr3+euMoau6qrLXuS7LsYviuboaCUj6kYpn2hdV8Ux7UmciuPafxeNuytj3q3icOpByGBq5lFMeBr4g94yyN1X2hBwmF6+KZ74upLG/LY3Y4vlnjdO3VW+Ex8MCRH/DAgFVVau+CYLkSmMnqG+C5ErQ2KlvgiC50tipb4IgudLYCeqbILkSNHbqmyBM5Mqc4xQKhdKf0HOlJ0V9EwSHBWjsBPVNkFypVKqA+ibYLtk4aezUN0GQXDeUsVPvJFeC5Pp39CaEuUNgliRwy/SQ3CSiYSE1eJIgEVHmEQv14waMHUGuf1RxJgeUQzYBpHU+kFOXzcwkgJTQ/1VxqDzIFdnXZnJFChdEEXtuWdc0yZqom1xBTmdUHJYNgohYekT/NQ9vEJGzkBPpc9WLNYuEdAgxd68BY0f0pdOqF3IQAcCRr+mB4zm+lLrSuK/+GSlsWva1mVwRBW3Oso1vlhcwyZWolVzf9tnImwDixyIG7BaPjD1IkXxZfW2TnsMHGtleNpSFl/x1GxpxBWWuKPusvARRGbkiUv5UQUV5MTOnU93yJWWOxYrjEIQbWQcQu3Rd+x0ksSIEdV0jlyxjOemZsS9JV7UfcsUwwoS2D9keDhnKHpTfSK75mEp5+SRXolZynRXvFVHzRxwb8D7xIJO01mOyPWk4fknONWKoY1nItyNdvR8sXgjbPTN2ZBld7cND+kbFY4g61jKey4icj+SaDegImQc+JbkSTZBr4n1ibBBZMU85NOBb6v3JL2zfNhy/J6OOeUP39nXB9XY9NfY58cpDZZdNIQGMHxNVmwy/rXuoh2Eh10taeya5ErWTa7p7jtnuxypOkVHUKKvI/gqveZuh3mEk18R7T1LPnLas94F085UjuQZtaMQlyyBlzqMS9RHEQMhVSdf8nOZ9ho4Nu+vQqG2WIulYkmEEH409Xe6sKl7Whgmruzm/r2YMC3zAYYHcMugJjJJcCZ/INSHYoCbPFWOKHzpe3/cOXmGT5Ipu/ssCPWO8eSKnDIZePjfsP6Q4oVX04rddR0wQtZErljitaJ5oJ8Pw9bFFZH+ddzASrA6Ydbw+eK2/q3hdq+/k+iqn3BFVvA4W646vZuiNS7Hc2jhJlaiVXLGu8oTqzb6DuO6oeHImwfMMQ94rntlu2R6X7SmHRj0qxyTLjTC585PFdc8IwR5Lec/bZPthA8Z+T+4h+YigI8MC53OOuSm6LwI+6vhWyHpE6nzQlkZMciWGlVwnxdMMVO/z1xmtDCZbVlX2OtdlOXZRvDHXRg2SxuTDutRhO9M+Id7zGzkHhhhuqPx1u4My9v0qHqcOpByu6VJBfavK7kMIlLkmdeOzWqzz3dxyci3T1Se5Eo0PCxD9GWdAVdWqb4IgudLYCeqbILkSNHbqmyBIrgRBECRXgiCIISdXCoVCoVQo/wMyqkfKYpHntgAAAoB0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bXRhYmxlIGNvbHVtbmFsaWduPSJsZWZ0IiBjb2x1bW5saW5lcz0ic29saWQiIGZyYW1lPSJzb2xpZCIgcm93bGluZXM9InNvbGlkIj48bXRyPjxtdGQ+PG10ZXh0PiYjeEEwO1QtU2hpcnRzJiN4QTA7PC9tdGV4dD48L210ZD48bXRkPjxtdGV4dD4mI3hBMDtUb3RhbCBjb3N0JiN4QTA7PC9tdGV4dD48L210ZD48bXRkPjxtdGV4dD4mI3hBMDtOdW1iZXIgb2YgdC1zaGlydHMmI3hBMDs8L210ZXh0PjwvbXRkPjwvbXRyPjxtdHI+PG10ZD48bXRleHQ+JiN4QTA7U3RvcmUgQSYjeEEwOzwvbXRleHQ+PC9tdGQ+PG10ZD48bW8+JDwvbW8+PG1uPjQ4PC9tbj48L210ZD48bXRkPjxtbj4zPC9tbj48L210ZD48L210cj48bXRyPjxtdGQ+PG10ZXh0PiYjeEEwO1N0b3JlIEImI3hBMDs8L210ZXh0PjwvbXRkPjxtdGQ+PG1vPiQ8L21vPjxtbj45NjwvbW4+PC9tdGQ+PG10ZD48bW4+MTY8L21uPjwvbXRkPjwvbXRyPjxtdHI+PG10ZD48bXRleHQ+JiN4QTA7U3RvcmUgQyYjeEEwOzwvbXRleHQ+PC9tdGQ+PG10ZD48bW8+JDwvbW8+PG1uPjcwPC9tbj48L210ZD48bXRkPjxtbj4xNDwvbW4+PC9tdGQ+PC9tdHI+PC9tdGFibGU+PC9tYXRoPrb/zHYAAAAASUVORK5CYII=)
Find the unit rate of store C in shirt per $.
Analyze the table below and answer the questions that follow.
![Error converting from MathML to accessible text.](data:image/png;base64,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)
Find the unit rate of store B in shirt per $.
Analyze the table below and answer the questions that follow.
![Error converting from MathML to accessible text.](data:image/png;base64,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)
Find the unit rate of store B in shirt per $.
Analyze the table below and answer the questions that follow.
![Error converting from MathML to accessible text.](data:image/png;base64,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)
Find the unit rate of store A in $ per shirt.
Analyze the table below and answer the questions that follow.
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)
Find the unit rate of store A in $ per shirt.
John reads 50 books in 6 months. At the same rate, number of books he will read in a year is ______________.
We can find the number of books read in 1 year by multiplying the number of books read in 6 months by 2.
John reads 50 books in 6 months. At the same rate, number of books he will read in a year is ______________.
We can find the number of books read in 1 year by multiplying the number of books read in 6 months by 2.