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The owner of Nuts20 Snack Shack mixes cashews worth $5.75 a pound with peanuts worth $2.00 a pound to get a half-pound mixed nut bag worth $1.70. How much of each kind of nut is included in the moved bag?OA. 0.313 lb of cashews and 0.187 lb of peanutsOB. 0.10 lb of cashews and 0 90 lb of peanutsOC. 0.187 lb of cashews and 0 313 lb of peanutsOD. 0.07 lb of cashews and 0.93 lb of peanuts

User Volk
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1 Answer

8 votes
8 votes

Answer:

C. 0.187 lb of cashews and 0 313 lb of peanuts

Step-by-step explanation:

Let's call x the number of pounds of cashews and y the number of pounds of peanuts.

If the owner wants a half-pound mixed, we get that the sum of the pounds of each product is 0.5 lb, so:

x + y = 0.5

On the other hand, cashews worth $5.75 a pound, peanuts worth $2.00 a pound, and the mixed nut bag worth $1.70, so we can write the following equation:

5.75x + 2y = 1.70

Where 5.75x is the worth of the cashews in the mixed and 2y is the worth of the peanuts in the mixed.

Therefore, we have the following system of equations:

x + y = 0.5

5.75x + 2y = 1.70

Solving the first equation for y:

x + y = 0.5

x + y - x = 0.5 - x

y = 0.5 - x

Subtitude y = 0.5 - x on the second equation:

5.75x + 2y = 1.70

5.75x + 2(0.5 - x) = 1.70

Apply the distributive property and add like terms:

5.75x + 2(0.5) - 2(x) = 1.70

5.75x + 1 - 2x = 1.70

3.75x + 1 = 1.70

Solve for x:

3.75x + 1 - 1 = 1.70 - 1

3.75x = 0.70

3.75x/3.75 = 0.70/3.75

x = 0.187

Finally, we can calculate the value of y as:

y = 0.5 - x

y = 0.5 - 0.187

y = 0.313

Therefore, the mixed bag will include 0.187 lb of cashews and 0.313 lb of peanuts.

User TAGraves
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