The range will be all ur y values...just as the domain is all the x values
so ur range is {5,6 }...notice that even though they repeat, u only have to list them once
Answer:
m<MON = 57°
Step-by-step explanation:
Glad to help ;)
Answer:
1/4, 5/9, 9/10, 99/100
Step-by-step explanation:
<u>Step 1: Make common denominators</u>
The common denominator is: 900
<u>Step 2: Make sure they all have common denominator</u>
5/9 * 100/100 = 500/900
99/100 * 9/9 = 891/900
1/4 * 225/225 = 225/900
9/10 * 90/90 = 810/900
<u>Step 3: Order the fraction from smallest to largest</u>
225/900, 500/900, 810/900, 891/900
<u>Step 4: Check to see what the original values were</u>
1/4, 5/9, 9/10, 99/100
Answer: 1/4, 5/9, 9/10, 99/100
Answer:
180+69=249
I got 180 from the ABC, that is half the circle then + the 69
Answer:
a) the probability is P(G∩C) =0.0035 (0.35%)
b) the probability is P(C) =0.008 (0.8%)
c) the probability is P(G/C) = 0.4375 (43.75%)
Step-by-step explanation:
defining the event G= the customer is a good risk , C= the customer fills a claim then using the theorem of Bayes for conditional probability
a) P(G∩C) = P(G)*P(C/G)
where
P(G∩C) = probability that the customer is a good risk and has filed a claim
P(C/G) = probability to fill a claim given that the customer is a good risk
replacing values
P(G∩C) = P(G)*P(C/G) = 0.70 * 0.005 = 0.0035 (0.35%)
b) for P(C)
P(C) = probability that the customer is a good risk * probability to fill a claim given that the customer is a good risk + probability that the customer is a medium risk * probability to fill a claim given that the customer is a medium risk +probability that the customer is a low risk * probability to fill a claim given that the customer is a low risk = 0.70 * 0.005 + 0.2* 0.01 + 0.1 * 0.025
= 0.008 (0.8%)
therefore
P(C) =0.008 (0.8%)
c) using the theorem of Bayes:
P(G/C) = P(G∩C) / P(C)
P(C/G) = probability that the customer is a good risk given that the customer has filled a claim
replacing values
P(G/C) = P(G∩C) / P(C) = 0.0035 /0.008 = 0.4375 (43.75%)