a) Wilma was born in a
family
Answers
Answer:
Answer:
The required probability is 1 .
Step-by-step explanation:
In any event , the sum of P(A) and P'(A) is always 1 .
Here , in a cricket match , the batswoman hits a boundary 25 times out of the 60 balls she plays .
The total number of balls ( Sample Space ) 60
Favourable Cases ( The no of times she hit a boundary ) > 25
Unfavourable Cases > 35
Probability that she hit a boundary > 25/60
Probability that she didn't hit a boundary > 35/60
Probability that she hit a boundary + Probability that she didn't hit a boundary
> 25/60 + 35/60
> 60/60
> 1
Additional Information :
\begin{gathered} \boxed {\begin{minipage}{9.2 cm}\\ \dag \: \underline{\Large\bf Formulas\:of\:Statistics} \\ \\ \bigstar \: \underline{\rm Mean:} \\ \\ \bullet\sf M=\dfrac {\Sigma x}{n} \\ \bullet\sf M=a+\dfrac {\Sigma fy}{\Sigma f} \\ \\ \bullet\sf M=A +\dfrac {\Sigma fy^i}{\Sigma f}\times c \\ \\ \bigstar \: \underline{\rm Median :} \\ \\ \bullet\sf M_d=\dfrac {n+1}{2} \:\left[\because n\:is\:odd\:number\right] \\ \bullet\sf M_d=\dfrac {1}{2}\left (\dfrac {n}{2}+\dfrac {n}{2}+1\right)\:\left[\because n\:is\:even\:number\right] \\ \\ \bullet\sf M_d=l+\dfrac {m-c}{f}\times i \\ \\ \bigstar \: {\boxed{\sf M_0=3M_d-2M}}\end {minipage}} \end{gathered}