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An export company is reserving some containers to ship cargo overseas, and the expense must be under $54,000\$54,000. A standard container costs $1,600\$1,600 and a large container costs $3,000\$3,000.\newlineSelect the inequality in standard form that describes this situation. Use the given numbers and the following variables.\newlinex=x = the number of standard containers\newliney=y = the number of large containers\newlineChoices:\newline(A) 1,600x+3,000y54,0001,600x + 3,000y \leq 54,000\newline(B) 1,600+x+3,000+y54,0001,600 + x + 3,000 + y \leq 54,000\newline(C) 1,600 + x + 3,000 + y < 54,000\newline(D) 1,600x + 3,000y < 54,000

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Q. An export company is reserving some containers to ship cargo overseas, and the expense must be under $54,000\$54,000. A standard container costs $1,600\$1,600 and a large container costs $3,000\$3,000.\newlineSelect the inequality in standard form that describes this situation. Use the given numbers and the following variables.\newlinex=x = the number of standard containers\newliney=y = the number of large containers\newlineChoices:\newline(A) 1,600x+3,000y54,0001,600x + 3,000y \leq 54,000\newline(B) 1,600+x+3,000+y54,0001,600 + x + 3,000 + y \leq 54,000\newline(C) 1,600+x+3,000+y<54,0001,600 + x + 3,000 + y < 54,000\newline(D) 1,600x+3,000y<54,0001,600x + 3,000y < 54,000
  1. Calculate Standard Container Cost: Determine the cost for one standard container and the number of standard containers.\newlineCost of one standard container: $1,600\$1,600\newlineNumber of standard containers: xx\newlineWhat is the total cost for standard containers?\newlineCost of one standard container ×\times Number of standard containers\newline= $1,600×x\$1,600 \times x\newline= $1,600x\$1,600x\newlineTotal cost for standard containers: $1,600x\$1,600x
  2. Calculate Large Container Cost: Determine the cost for one large container and the number of large containers.\newlineCost of one large container: $3,000\$3,000\newlineNumber of large containers: yy\newlineWhat is the total cost for large containers?\newlineCost of one large container ×\times Number of large containers\newline= $3,000×y\$3,000 \times y\newline= $3,000y\$3,000y\newlineTotal cost for large containers: $3,000y\$3,000y
  3. Combine Total Costs: Combine the total costs for both standard and large containers.\newlineTotal cost for standard containers: $1,600x\$1,600x\newlineTotal cost for large containers: $3,000y\$3,000y\newlineWhat is the total combined cost for all containers?\newlineAdd total cost for standard containers and total cost for large containers.\newline$1,600x+$3,000y\$1,600x + \$3,000y
  4. Determine Expense Inequality: Determine the inequality that represents the situation where the total expense must be under $54,000\$54,000.\newlineTotal combined cost for all containers: $1,600x+$3,000y\$1,600x + \$3,000y\newlineMaximum allowed expense: $54,000\$54,000\newlineSelect the inequality that describes this situation.\newlineTotal combined cost must be less than or equal to $54,000\$54,000.\newlineInequality: $1,600x+$3,000y$54,000\$1,600x + \$3,000y \leq \$54,000

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