a particular beach is eroding at a rate of 4 centimeters per year. a realtor converts this rate to…

a particular beach is eroding at a rate of 4 centimeters per year. a realtor converts this rate to millimeters per day. which expression, when evaluated, results in the correct units and numerical value?\\(\\frac{4\\text{ cm}}{1\\text{ year}} \\times \\frac{10\\text{ mm}}{1\\text{ cm}} \\times \\frac{1\\text{ year}}{365\\text{ days}}\\)\\(\\frac{4\\text{ cm}}{1\\text{ year}} \\times \\frac{1\\text{ mm}}{10\\text{ cm}} \\times \\frac{1\\text{ year}}{365\\text{ days}}\\)\\(\\frac{4\\text{ cm}}{1\\text{ year}} \\times \\frac{1\\text{ cm}}{10\\text{ mm}} \\times \\frac{365\\text{ days}}{1\\text{ year}}\\)\\(\\frac{4\\text{ cm}}{1\\text{ year}} \\times \\frac{10\\text{ mm}}{1\\text{ cm}} \\times \\frac{365\\text{ days}}{1\\text{ year}}\\)

a particular beach is eroding at a rate of 4 centimeters per year. a realtor converts this rate to millimeters per day. which expression, when evaluated, results in the correct units and numerical value?\\(\\frac{4\\text{ cm}}{1\\text{ year}} \\times \\frac{10\\text{ mm}}{1\\text{ cm}} \\times \\frac{1\\text{ year}}{365\\text{ days}}\\)\\(\\frac{4\\text{ cm}}{1\\text{ year}} \\times \\frac{1\\text{ mm}}{10\\text{ cm}} \\times \\frac{1\\text{ year}}{365\\text{ days}}\\)\\(\\frac{4\\text{ cm}}{1\\text{ year}} \\times \\frac{1\\text{ cm}}{10\\text{ mm}} \\times \\frac{365\\text{ days}}{1\\text{ year}}\\)\\(\\frac{4\\text{ cm}}{1\\text{ year}} \\times \\frac{10\\text{ mm}}{1\\text{ cm}} \\times \\frac{365\\text{ days}}{1\\text{ year}}\\)

Answer

Answer:

$\frac{4,\text{cm}}{1,\text{year}}\times\frac{10,\text{mm}}{1,\text{cm}}\times\frac{1,\text{year}}{365,\text{days}}$