For Exercises 8–13, rewrite each binomial of the form ( a − b ) n as [ a + ( − b ) ] n . Then expand the binomials. Use Pascal’s triangle to find the coefficients. ( p 2 − w ) 3
For Exercises 8–13, rewrite each binomial of the form ( a − b ) n as [ a + ( − b ) ] n . Then expand the binomials. Use Pascal’s triangle to find the coefficients. ( p 2 − w ) 3
Solution Summary: The author calculates the expanded form of the binomial (p2-w)3 using the Pascal's triangle for the coefficients.
For Exercises 8–13, rewrite each binomial of the form
(
a
−
b
)
n
as
[
a
+
(
−
b
)
]
n
. Then expand the binomials. Use Pascal’s triangle to find the coefficients.
(
p
2
−
w
)
3
Polygon with three sides, three angles, and three vertices. Based on the properties of each side, the types of triangles are scalene (triangle with three three different lengths and three different angles), isosceles (angle with two equal sides and two equal angles), and equilateral (three equal sides and three angles of 60°). The types of angles are acute (less than 90°); obtuse (greater than 90°); and right (90°).
Suppose you flip a fair two-sided coin four times and record the result.
a). List the sample space of this experiment. That is, list all possible outcomes that could
occur when flipping a fair two-sided coin four total times. Assume the two sides of the coin are
Heads (H) and Tails (T).
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