Enigma scooters Finance
Enigma Two Wheeler Loan EMI
MODEL | EMI (36 MONTHS) |
---|---|
Enigma Crink Pro | Rs. 3,727 |
Enigma Crink V1 | Rs. 3,173 |
Enigma Ambier N8 | Rs. 2,864 |
Enigma GT 450 Pro | Rs. 2,879 |
Enigma scooters Finance Schemes
FAQs for Enigma Finance
Q) How is Enigma scooter loan EMI calculated monthly?
A) Enigma scooter loan EMIs include the principal amount as well as the interest i.e. EMI = Principal Amount + Interest on Principal amount. Mathematically, EMI can be calculated using the following formula: {P x R x (1+R)^N / [(1+R)^N-1]} where, P = Principal amount of the loan, R = Rate of interest and N = Number of monthly installments.
Q) Which documents I need to have to apply for a Enigma two wheeler loan?
A) To get your Enigma scooter loan application with the selected lender, you would be required to submit your KYC documents, which include your identity proof and current address proof, a copy of your PAN Card, your bank statement and your income proofs (Form 16/Salary Slips/ITR). You can get the exact requirement from your loan consultant after applying with us.
Q) What will be the minimum down payment for a Enigma Bike/Scooter loan?
A) The lenders generally finance 90% of the ex-showroom price of the Enigma two wheeler. Some customers might be eligible for 100% funding too. This means the minimum possible down payment that you have to pay includes the RTO and insurance charges for the Enigma scooter. Down payment is the difference between the on-road price of the Enigma scooter and the amount funded by the lender.
Q) What will be the rate of interest on a Enigma scooter finance?
A) The interest rate primarily depends on the principal amount and tenure of the loan amount of the Enigma two wheeler. Interest rate of lenders generally varies from 9.7% per annum to 15% per annum.
Enigma Scooter News & Reviews
Enigma Scooters Further Research
Popular Enigma Two Wheelers
- Enigma Ambier N8Rs 95,000 - 1.05 Lakh*
- Enigma GT 450 ProRs 86,902*
- Enigma Crink V1Rs 96,835*
- Enigma Crink ProRs 1.15 Lakh*