Provide an appropriate response.In your own words, explain how to determine the binomial coefficient for x3y2 in the expansion of (x + y)5.
What will be an ideal response?
The numerator of the binomial coefficient for x3y2 in the expansion of (x + y)5 is a factorial of the exponent to which the binomial is raised (in this case, 5!). The denominator is a product of factorials: the power to which x is raised (in this case, 3!) and the degree of the binomial less the power to which x is raised (in this case, 2!). Thus, in this case, the binomial coefficient = 
. (Explanations will vary.)
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Below are the lengths of the sides of a triangle. Which is a right triangle?
A. 6, 4, 5 B. 6, 4, 6 C. 6, 8, 10 D. 7, 4, 6 E. none of these
Write the statements Sk and Sk+1.Sn: 2 is a factor of n2 + 11n
What will be an ideal response?
Rewrite as a fraction.305%
A. 
B. 
C. 
D. 
Solve the inequality.x4 < 81x2
A. (-9, 0) or (9, ?) B. (-?, -9) or (0, 9) C. (-?, -9) or (9, ?) D. (-9, 0) or (0, 9)