168,152 views
15 votes
15 votes
Steve has 12 biscuits in a tin.

There are 7 digestive and 5 chocolate biscuits.
Steve takes two biscuits at random from the tin.
Work out the probability that he chooses two different types of biscuits.

User Sebers
by
2.9k points

2 Answers

22 votes
22 votes

Answer:

35/132 = 0.27 (nearest hundredth)

Step-by-step explanation:

Total number of biscuits = 12

Number of digestives = 7

Number of chocolate biscuits = 5

The probability of the first biscuit being a digestive is 7/12

As the first biscuit was not replaced, the total number of biscuits is now 11.

So the probability of the second biscuit being chocolate is 5/11

Therefore, the probability of the first biscuit being a digestive AND the second being chocolate is:


(7)/(12)*(5)/(11)=(35)/(132)

Similarly,

The probability of the first biscuit being chocolate is 5/12

As the first biscuit was not replaced, the total number of biscuits is now 11.

So the probability of the second biscuit being a digestive is 7/11

Therefore, the probability of the first biscuit being chocolate AND the second being a digestive is:


(5)/(12)*(7)/(11)=(35)/(132)

User Kwirk
by
3.0k points
18 votes
18 votes

0.53 is the probability that he chooses two different types of biscuits.

Step-by-step explanation:

  • digestive biscuits: 7
  • chocolate biscuits: 5
  • total biscuits: 12

probability:


\rightarrow \sf (7)/(12) *(5)/(11) + (5)/(12) * (7)/(11)


\rightarrow \sf (35)/(66)


\rightarrow \sf 0.53

User Amit Kohli
by
3.2k points