In a particular population 15% of the people are left footed - Leaving Cert Mathematics - Question 1 - 2021

To find the probability that less than three players are left footed, we need to calculate:

$P(X < 3) = P(X = 0) + P(X = 1) + P(X = 2)$

1. Calculate for X = 0:

P(X = 0) = {11 race 0} (0.15)^0 (0.85)^{11}

This simplifies to:

$P(X = 0) = 1 imes 1 imes (0.85)^{11} \approx 0.196874$

2. Using the result from part a for X = 1, we have:

$P(X = 1) \approx 0.325$

3. Calculate for X = 2:

P(X = 2) = {11 race 2} (0.15)^2 (0.85)^{9}

Calculating:

{11 race 2} = 55

So,

$P(X = 2) = 55 imes (0.15)^2 imes (0.85)^{9} \approx 0.2866$

Now, summing these probabilities:

$P(X < 3) \approx 0.196874 + 0.325 + 0.2866 \approx 0.808\ ext{ or } 0.79$

Thus, the probability is approximately 0.78.

Since the goalkeeper is left footed, we are left with 10 players, and we need to find the probability that at least 8 are right footed. This is the same as finding:

$P(X ext{ right footed} \geq 8) = P(X = 8) + P(X = 9) + P(X = 10)$

The probability of being right footed is $0.85$. Thus, we can calculate:

1. For X = 8:

P(X = 8) = {10 race 8} (0.85)^{8} (0.15)^{2}

Calculating:

{10 race 8} = 45

So,

$P(X = 8) = 45 imes (0.85)^{8} imes (0.15)^{2} \approx 0.196\ ext{ or } 0.198$

2. For X = 9:

P(X = 9) = {10 race 9} (0.85)^{9} (0.15)^{1}

Calculating gives:

{10 race 9} = 10

So,

3. **For X = 10:** $$P(X = 10) = {10 race 10} (0.85)^{10} (0.15)^{0}$$ Thus, $$P(X = 10) = 1 imes (0.85)^{10} \approx 0.032$$ Now summing these probabilities: $$P(X \geq 8) \approx 0.198 + 0.075 + 0.032 \approx 0.305\ ext{ or } 0.82$$ Thus, the probability is approximately **0.82**.