Answer:
462ways
Step-by-step explanation:
This Is a combination problem, we we are expected to determine the number of possible ways of selecting the numbers of staffs for a business trip
C(n, r) were n= 11
r=5
C(n, r) = n!/(n-r)! r!
C(n, r) = 11!/(11-5)! 5!
C(n, r) = 11!/(6)! 5!
C(n, r) = 11*10*9*8*7*6!/(6)! 5*4*3*2*1
C(n, r) = 11*10*9*8*7/5*4*3*2*1
C(n, r) = 55440/120
C(n, r) = 462
The number of possible ways is 462
Answer:
3 and -3
Step-by-step explanation:
A tick mark represents one and it's opposite so after two the integer and it's opposite being shown is 3 and -3.
A)He earns $15 an hour because every time its going up by 15
for example ( 15, 30, 45, 75, 120, 150 )
B) carl earns more per hour
C) it would be graph like ( 1, 15 ) ( 2, 30 ) ( 3, 45 ) ( 4, 75 ) ( 5, 120 ) ( 6, 150 )
I hope this helped!
please mark this as brainiest! I need it!
A dilation of 2 was performed (:
Answer:
1246 teams
Step-by-step explanation:
We are told there are 7women & 6men.
If 5 people are selected and there must be more women than men in the team.
This means there must be a minimum of 3 women.
Thus;
For 3 women;
7C3 × 6C2 = 525
For 4 women;
7C4 × 6C3 = 700
For 5 women;
7C5 × 6C0 = 21
Thus;
Total = 525 + 700 + 21 = 1246 teams
