<span> a. each candy has 4 choices, so 4^3 = 64
b. using the stars and bars formula, (3+4-1)C3 = 6c3 = 20
c. in 1 box , in 2 boxes or 3 boxes: 3c3 +3c2 + 3c1 = 7
d. in 1 box, 2 boxes or 3 boxes = 3
e. in 1 box (4) , in 2 boxes : 2combos (AA|B & AB|A) distributed to boxes in 4!/2! ways, and 1 each a box distributed to boxes in 4!/2! ways = 4+24+12 = 40 ways</span>
Answer:
n = 27
Step-by-step explanation:
multiply each term by 3 and simplify.
Answer:
trueeeee
Step-by-step explanation:
An infinite geometric series is the sum of an infinite geometric sequence . This series would have no last term. The general form of the infinite geometric series is a1+a1r+a1r2+a1r3+... , where a1 is the first term and r is the common ratio. We can find the sum of all finite geometric series.