A box of colored crayons contains 11 distinct colors. In how many ways can 8 colors be chosen, assuming that the order of the colors chosen doesn't matter?
A box of colored crayons contains 11 distinct colors. In how many ways can 8 colors...
Suppose we want to choose 4 colors, without replacement, from 16 distinct colors. (a) How many ways can this be done, if the order of the choices does not matter? x 6 ? (b) How many ways can this be done, if the order of the choices matters?
In how many distinct ways can the letters of the word ABRACADABRA be arranged? A. 11! 11! B. 5!2! 11! C. 5!2!2! 11 5 2 2 2 11 O E. 0 11 Reset Selection
If q colors are available, how many ways can a. the vertices of a tetrahedron be painted? b. the edges of a tetrahedron be painted?
Suppose we want to choose 7 objects, without replacement, from 11 distinct objects. (a) How many ways can this be done, if the order of the choices is not relevant? Х 5 ? E (b) How many ways can this be done, if the order of the choices is relevant? 0
In how many ways can a committee of size 12 be formed from 20 people? Assume that, when people are chosen for a committee, the order of the choices does not matter
How many ways are there to select 6 pieces of fruit from a huge box containing apples, oranges, lemons, and grapefruits? (The order in which the pieces are selected does not matter, only the type of fruit and not the individual pieces matter, and there are a lot more than 6 pieces of each fruit in the box.)
o A package has 8 lightbulbs. How many ways can we select 5 if the order doesnt matter? cs = 8! (8-5)!57 - If ce are broken, what is the probability that s are broken
a. In how many ways can 3 out of 11 engineers be assigned to the project roles of team leader, test engineer, and quality engineer? b. A carton of 18 rechargeable batteries contains three that are defective. In how many ways can an inspector choose 4 of the batteries and get exactly one defective battery?
12) How many ways are there to distribute 150 identical balls to 12 distinct boxes, 6 red boxes labelled 1 to 6 and 6 blue boxes labelled 1 to 6, such that the blue be with label i and the red box with labeli receive the same number of balls, for every ie (1,2,3,4,5, 6}? [10 marks 12) How many ways are there to distribute 150 identical balls to 12 distinct boxes, 6 red boxes labelled 1 to 6 and...