Answer:
[tex]P(T\ n\ S) = \frac{1}{14}[/tex]
Step-by-step explanation:
*Missing Part of the Question*
4 stars
5 triangles
3 circles
3 squares
Required
Determine the probability of triangle being first then square being second
[tex]Total = 4 + 5 + 3 + 3[/tex]
[tex]Total = 15[/tex]
Represent the triangle with T and square with S
So, we're solving for P(T n S)
[tex]P(T\ n\ S) = P(T) * P(S)[/tex]
Solving for P(T)
[tex]P(T) = \frac{n(T)}{Total}[/tex]
[tex]P(T) = \frac{5}{15}[/tex]
Solving for P(S)
The question implies a probability without replacement;
Hence Total has now been reduced by 1
Total = 14
[tex]P(S) = \frac{n(S)}{Total}[/tex]
[tex]P(S) = \frac{3}{14}[/tex]
Recall that
[tex]P(T\ n\ S) = P(T) * P(S)[/tex]
[tex]P(T\ n\ S) = \frac{5}{15} * \frac{3}{14}[/tex]
[tex]P(T\ n\ S) = \frac{15}{15 * 14}[/tex]
[tex]P(T\ n\ S) = \frac{1}{14}[/tex]
Hence, the required probability is
[tex]P(T\ n\ S) = \frac{1}{14}[/tex]
