Problem Solving

Hi, today I am learning about probabilities. Unfortunately I messed up between two types of questions. Basically I could not understand why the author have applied the different approach to the following questions that looks same.

Here are questions:-

Question 1: From a pack of 52 cards, two cards are drawn together at random. What is the probability that one is a spade and one is a heart?

a) 3/20
b) 29/34
c) 47/100
d) 13/102

Solution 1:

Let S be the sample space. Then,

n(S) = 52C2 = 52X51/2X1 = 1326.

Let E = event of getting 1 spade and 1 heart.
Therefore, n(E) = number of ways of choosing 1 spade out of 13 and 1 heart out of 13.

= 13C1 X 13C1 = 13 X 13 = 169 (Why he multiplied over here?)

Therefore, P(E) = n(E)/n(S) = 13/102
...........................................................................................................

Question 2: A box contains 5 green, 4 yellow and 3 white marbles. Three marbles are drawn at random. What is the probability that they are not of the same color?

a) 3/44
b) 3/55
c) 52/55
d) 41/44

Solution 2:

Let S be the sample space. Then,
n(S) = number of ways of drawing 3 marbles out of 12.
= 12C3 = 220.

Let E be the event of drawing 3 balls of the same color.
Thus E = event of drawing (3 balls out of 5) or (3 balls out of 4) or (3 balls out of 3)

Therefore, n(E) = 5C3 + 4C3 + 3C3 = 15
(Why he has done addition over here?
Why not multiplication like he has done in previous question?
Why not he has done it like 5C1 X 4C1 X 3C1?
Is there any difference between drawing of card out of pack and drawing of marbles out of sack?)

= P(E) = n(E)/n(S) = 15/220 = 3/44

Therefore required probability = 1 - P(E) = 41/44

(Isn't author has missed the case of group where two balls are of same color and one is of different color)?

TIA....