What is sentencing for a 2C:28-4B
The degree of a polynomial is determined by the term with the highest total degree when considering the sum of the exponents of the variables in each term. For the polynomial (5a^2bc + 6a^2b^3c - 7b^2c^7), the degrees of the individual terms are 4 (from (5a^2bc)), 5 (from (6a^2b^3c)), and 9 (from (-7b^2c^7)). Therefore, the degree of the polynomial is 9.
12-2c = 2c add 2c to both sides 12 = 4c divide both sides by 4 3 = c
To determine the degree of the polynomial (5a^2bc + 6a^2b^3c - 7b^2c^7), we need to find the term with the highest total degree. The degrees of the individual terms are as follows: (5a^2bc) has a degree of 4 (2 from (a^2), 1 from (b), and 1 from (c)), (6a^2b^3c) has a degree of 6 (2 from (a^2), 3 from (b^3), and 1 from (c)), and (-7b^2c^7) has a degree of 9 (2 from (b^2) and 7 from (c^7)). Therefore, the polynomial's degree is 9.
1-2c = -1
4a*2c=8ac
1 degree.
Start by multiplying with 9 and divide by 5. Then add 32 to the answer. In this case the answer is 35 degree fahrenheit.
the greatest common factor of 2c squared times 2c is 2c
12-2c = 2c add 2c to both sides 12 = 4c divide both sides by 4 3 = c
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2417-2c = 2415
-2c
4a-2c = 2
2c+4c-3c+5c = 6c +2c = 8c
To determine the degree of the polynomial (5a^2bc + 6a^2b^3c - 7b^2c^7), we need to find the term with the highest total degree. The degrees of the individual terms are as follows: (5a^2bc) has a degree of 4 (2 from (a^2), 1 from (b), and 1 from (c)), (6a^2b^3c) has a degree of 6 (2 from (a^2), 3 from (b^3), and 1 from (c)), and (-7b^2c^7) has a degree of 9 (2 from (b^2) and 7 from (c^7)). Therefore, the polynomial's degree is 9.
4c-7 = 2c+11 4c-2c = 11+7 2c = 18 c = 9
1-2c = -1