Provide an appropriate response.Is the quotient of two monomials always a monomial? Why or why not? If not, give an example.
What will be an ideal response?
The quotient of two monomials may not be a monomial just as the quotient of two integers may not be an integer. For example, 14x divided by 7xy is equal to 
, which is not a monomial because there is a variable in the denominator of the fraction. (Answers may vary.)
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Use a calculator to find an approximate solution to the equation. Round your answer to the nearest thousandth.6n2 = -12n - 5
A. {-0.296, -0.704} B. {-1.592, -2.408} C. {-0.592, -1.408} D. {0.354, -2.354}
Multiply. Simplify by combining like terms.(a + 6b)(a + 10b)
A. b2 + 13ab + 60a2 B. 1 + 16ab + 16b2 C. a2 + 16ab + 60b2 D. a2 + 16a + 60b2
Determine whether the statement is true or false.7[4 + (4 - 3)] < 29
A. True B. False
Evaluate.
A. 429 B. 51480 C. 6435 D. 3432