Respuesta :
Answer:
- Logarithms of the odds of fraud = -1.595 (option B)
- Odds of fraud = 0.02541
- Probability of fraud = 0.0248
- Probability of no fraud = 0.9752
Step-by-step explanation:
The model estimate for the logarithm of the odds of fraud is: 53.119 - 0.081×CityCode + 0.367× SexCode + 0.060×Age - 1.738× FaultCode - 0.142×Deductible
The five independent (predictor) variables included in the model are:
– i . CityCode : =1 if the claimant lived in a large city, =0 otherwise;
– ii. SexCode :=1 for males, =0 for females;
– iii. Age in years;
– iv. FaultCode :=1 if the fault in the accident was that of the policy holder, =0 otherwise;
– v. Deductible Amount (in dollars)
So, the insurance company has a claim by a male policyholder ages 30 years, who lives in a large city, has a deductible of $400 and who was not at fault in thr accident,
Extracting the variables from this information
- Citycode = 1 (since the policyholder lives in a large city)
- Sexcode = 1 (since the policyholder is a male)
- Age in years = 30
- Faultcode = 0 (since the policyholder wasn't at fault for the accident)
- Deductible Amount in dollars = 400
Logarithms of the odds of fraud
= 53.119 - 0.081×CityCode + 0.367× SexCode + 0.060×Age - 1.738× FaultCode - 0.142×Deductible
Slotting in the variables
Logarithms of the odds of fraud
= 53.119 - (0.081×1) + (0.367× 1) + (0.060×30) - (1.738×0) - (0.142×400)
= 53.119 - 0.081 + 0.367 + 1.8 - 0 - 56.8
= -1.595
Logarithms of the odds of fraud = -1.595
Odds of fraud = Antilog (-1.595) = 0.0254097270555 = 0.02541
Probability of fraud = (odds)/(1 + odds)
= (0.02541/1.02541) = 0.0248
Probability of no fraud = 1 - (Probability of fraud)
= 1 - 0.0248 = 0.9752
Hope this Helps!!!
