Elizabeth has 8 ounces of meat in her bowl to create a recipe. Each cup holds 3 ounces. The minimum amount of meat to be used is 50 ounces. Write an inequality explaining how many times she must use the cup to follow the recipe accordingly.

Answer:Hence the inequality expression for number times she must use the cup is [tex]x\geq 14[/tex]Step-by-step explanation:Given:Meat in bowl to create a recipe = 8 ouncesMeat in each cup = 3 ouncesMinimum amount of meat to be used = 50Let number of times cups used be xHence the inequality expression can be formed as Meat in bowl to create a recipe plus Meat in each cup Multiply by number of times cups used should be greater than or equal to Minimum amount of meat to be used. [tex]\textrm{Meat in the bowl to create a recipe} + \textrm{Meat in each cup} \times \textrm{number of times cups used} \geq \textrm{Minimum amount of meat to be used}.\\8+3x\geq 50[/tex][tex]3x\geq 50-8\\3x\geq 42\\x\geq \frac{42}{3}\\\\x\geq 14[/tex]Hence the inequality expression for number times she must use the cup is [tex]x\geq 14[/tex]