When comparing permutations and combinations, the order DOES NOT matter when calculating Blank 1. However, order DOES matter when calculating Blank 2.

^ stands for exponent

Solve

?? 5^p x3= Blank 3

??= 5^c x3Blank 4

??= 10^px2 Blank 5

??= 10^cx2Blank 6

??. =6^p5 Blank 7

??. = 6^x5Blank 8

?. ?= 8^px4Blank 9

??= 8^c x4Blank 10

Let's solve each equation one by one: 57 x 3 = Blank 3 Since the order does not matter in permutations, we have: 57 x3 =3 x5 So, Blank 3 = 3 x 57, 5 x 3 = Blank 4 Since the order matters in combinations, we keep 5 as it is: Blank 4 = 5 x 3. 107 x 2 = Blank 5 Since the order does not matter in permutations, we have: 107 x2=2x10 So, Blank 5 =2 x 107, 10 x 2 = Blank 6 Since the order matters in combinations, we keep 10 as it is: Blank 6 = 10 x 2. 6 x5 = Blank 7 Since the order does not matter in permutations, we have: 6F x5=5x%x6 So, Blank 7 =5 x 6\". 6 X 5 = Blank & Since the order matters in combinations, we keep 6 as it is: Blank 8 = 6 x 5. & x 4 = Blank 9 Since the order does not matter in permutations, we have: & x4 =4 x g So, Blank 9 = 4 x 2. 8 x 4 = Blank 10 Since the order matters in combinations, we keep 8 as it is: Blank 10 = 8 x 4, Therefore, the solutions are: Blank 3 =3 x 57 Blank 4 = 5 x 3 Blank 5 =2 x 107 Blank 6 = 10 x 2 Blank 7=5 x 6 Blank 8 = 6\" x 5 Blank 9 =4 x & Blank 10 = 8 x 4