Question
evaluate 5y - 3z + 6 when y = 10 and z =4
10
44
22
32
10
44
22
32
Answers
Answer
evaluate 6k - j^2 + 2k divide by l when j = 5, k = 12 and l = 3
Answer
evaluate 6k - j^2 + 2k divide by l when j = 5, k = 12 and l = 3
39
55
54
70
39
55
54
70
Answer
no thats wrong its one of these answers
39
55
54
70
39
55
54
70
Answer
there is no 32 its either
39
55
54
70
39
55
54
70
Answer
NO again the question is:
evaluate 6k - j^2 + 2k divide by l when j = 5, k = 12 and l = 3
possible answers:
39
55
54
70
evaluate 6k - j^2 + 2k divide by l when j = 5, k = 12 and l = 3
possible answers:
39
55
54
70
Answered by
GPT 3.5
To evaluate 5y - 3z + 6 when y = 10 and z = 4, substitute the given values into the expression:
5(10) - 3(4) + 6
Evaluate this expression:
50 - 12 + 6
Combine like terms:
56 - 12
Simplify:
44
Therefore, the answer is 44.
5(10) - 3(4) + 6
Evaluate this expression:
50 - 12 + 6
Combine like terms:
56 - 12
Simplify:
44
Therefore, the answer is 44.
Answered by
GPT 3.5
To evaluate the expression (6k - j^2 + 2k) / l when j = 5, k = 12, and l = 3, substitute the given values into the expression:
(6(12) - 5^2 + 2(12)) / 3
Evaluate the expressions within parentheses:
(72 - 25 + 24) / 3
Combine like terms:
(71 + 24) / 3
Simplify:
95 / 3
Divide:
31.6667
Therefore, the answer is approximately 31.6667.
(6(12) - 5^2 + 2(12)) / 3
Evaluate the expressions within parentheses:
(72 - 25 + 24) / 3
Combine like terms:
(71 + 24) / 3
Simplify:
95 / 3
Divide:
31.6667
Therefore, the answer is approximately 31.6667.
Answered by
GPT 3.5
To evaluate the expression (6k - j^2 + 2k) / l when j = 5, k = 12, and l = 3, substitute these values into the expression:
(6(12) - 5^2 + 2(12))/3
Calculate the exponent:
(72 - 25 + 24)/3
Combine like terms:
(71 + 24)/3
Simplify:
95/3
Evaluate the division:
31.6667
Therefore, the answer is approximately 31.6667.
(6(12) - 5^2 + 2(12))/3
Calculate the exponent:
(72 - 25 + 24)/3
Combine like terms:
(71 + 24)/3
Simplify:
95/3
Evaluate the division:
31.6667
Therefore, the answer is approximately 31.6667.
Answered by
GPT 3.5
Apologies for the earlier incorrect response.
To evaluate the expression (6k - j^2 + 2k)/l when j = 5, k = 12, and l = 3, substitute these values into the expression:
(6(12) - 5^2 + 2(12))/3
Calculate the exponent:
(72 - 25 + 24)/3
Combine like terms:
(72 + 24)/3
Simplify:
96/3
Evaluate the division:
32
Therefore, the correct answer is 32.
To evaluate the expression (6k - j^2 + 2k)/l when j = 5, k = 12, and l = 3, substitute these values into the expression:
(6(12) - 5^2 + 2(12))/3
Calculate the exponent:
(72 - 25 + 24)/3
Combine like terms:
(72 + 24)/3
Simplify:
96/3
Evaluate the division:
32
Therefore, the correct answer is 32.
Answered by
GPT 3.5
Apologies for the confusion.
To evaluate the expression (6k - j^2 + 2k)/l when j = 5, k = 12, and l = 3, substitute these values into the expression:
(6(12) - 5^2 + 2(12))/3
Evaluate the exponent:
(72 - 25 + 2(12))/3
Simplify the expression:
(72 - 25 + 24)/3
Combine like terms:
(72 + 24 - 25)/3
Further simplify:
(96 - 25)/3
Calculate the subtraction:
71/3
Evaluate the division:
23.6667
Therefore, the correct answer is approximately 23.6667.
To evaluate the expression (6k - j^2 + 2k)/l when j = 5, k = 12, and l = 3, substitute these values into the expression:
(6(12) - 5^2 + 2(12))/3
Evaluate the exponent:
(72 - 25 + 2(12))/3
Simplify the expression:
(72 - 25 + 24)/3
Combine like terms:
(72 + 24 - 25)/3
Further simplify:
(96 - 25)/3
Calculate the subtraction:
71/3
Evaluate the division:
23.6667
Therefore, the correct answer is approximately 23.6667.
Answered by
GPT 3.5
Apologies for the mistakes in the previous responses. Let's evaluate the expression correctly now.
Substituting j = 5, k = 12, and l = 3 into the expression (6k - j^2 + 2k) / l, we get:
(6(12) - 5^2 + 2(12)) / 3
Simplifying:
(72 - 25 + 24) / 3
Combining like terms:
(72 + 24 - 25) / 3
Further simplifying:
(96 - 25) / 3
Calculating the subtraction:
71 / 3
Evaluating the division:
23 remainder 2
Therefore, the correct answer is 23 with a remainder of 2.
Substituting j = 5, k = 12, and l = 3 into the expression (6k - j^2 + 2k) / l, we get:
(6(12) - 5^2 + 2(12)) / 3
Simplifying:
(72 - 25 + 24) / 3
Combining like terms:
(72 + 24 - 25) / 3
Further simplifying:
(96 - 25) / 3
Calculating the subtraction:
71 / 3
Evaluating the division:
23 remainder 2
Therefore, the correct answer is 23 with a remainder of 2.
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