Real Replica Tunes The Third (493 tunes): Jag XKR-S GT3

  • Thread starter ich122
  • 1,814 comments
  • 665,846 views
1998 RUF Turbo R (993)


Buy a RUF CTR2 in any colour you want

Things to buy:
FC Transmission

The Tune:

Transmission:
Set Top Speed to 193

Ratios:
1st gear: 3.82
2nd gear: 2.15
3rd gear: 1.56
4th gear: 1.21
5th gear: 0.97
6th gear: 0.75
Final: 3.44

Power:
Put Power Limiter to 95.4%

Body:
Ballast weight: 200kg

Very basic tune but not much specifications I could find for this car :( if anyone finds better specifications for this car then feel free to either remake the tune or send me the better specifications to me through a message. Anyway, enjoy

Thanks @ich122 for gear ratios :)
 
Last edited:
1997 RUF CTR-2 Sport (993)

Buy a RUF CTR2 in any colour

Things to buy:
Engine Tuning Stage 3
Fully Customisable Transmission
Weight Reduction Stage 2

The Tune:

Power:
Set Power Limiter to 82.8%

Body:
Set Ballast Weight to 95kg

Again if you find better specifications please message me and I will edit the tune according to the specs of the car in real life
 
Last edited:
Mazda MX-5 Miata Yusho Concept '12
446 PP
238 hp/1100 kg

Buy a Mazda Roadster RS (NC) '07.

Custom Parts:
Aero Kit Type A
ENKEI RPF1

Tuning Parts:
Sports Hard Tires
FC Suspension
Engine Tuning Stage 1
Sports Computer
Sports Exhaust
Supercharger

The Tune:
Suspension -
Ride Height: 125/125
Spring Rate: 5.25/5.00
Dampers C: 3/3
Dampers E: 3/3
Anti-Roll: 4/4
Camber: 0/0
Toe: 0/.2

Power -
Power Limiter: 238 hp

Stowe Circuit Time: 0:57.607
 
Callaway Competition Corvette Z06R GT3
540PS/532HP/397kw
PP 559

circuitdespa-francorcdfeww.jpg



Buy a Chevrolet Corvette Z06 (C6). Reinforce the chassis. Buy silver ENKEI RC-T4 (standard size). Buy front aero A

Rear wing parts:

Mount: B
Wing: B
Winglet: A
Height: +1
Width: +15

Used colors for picture:

Car: Machine Silver Metallic
Wheel: ---

Parts to buy:

racing tires
FC suspension
racing brakes
fc gearbox
tripple-plate clutch
LSD
titan racing exhaust
stage 2 weight reduction
carbon bonnet (body color)

and the setup:

height:84/90
spring:14.45/15.76
damp com:7/8
damp ext:5/6
roll:3/3
cam:1.3/0.9
toe:0.00/0.17

brakes:7/6

trans:
first set the final gear to 5.000 then the top speed to 220kph/137mph
1st:3.083
2nd:2.067
3rd:1.625
4th:1.333
5th:1.115
6th:0.923
Final:3.420

LSD
int:10
acc:15
bra:18

powerlimit: 540PS/532HP/397kw ~98,4%

Aero: 20

weight: add 21 kg to position +30 (1252 kg @ 50/50)
 
Can I suggest a couple tunes for V8 Supercars

Holden Commodore SS '04
Mercedes-Benz C 63 AMG '08

I'll try to make my own fantasy cars otherwise.
 
Last edited:
Update on the GTV and Spider 2.0 V6 TB:

It turns out you can`t put a turbo on either cars, so the tunes can`t be done, sadly.
 
Please do a replica tune of the 2005 Lotus Elise of Frank Profera! http://data:image/jpeg;base64,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
LAR_6754.jpg
 
Please do a replica tune of the 2005 Lotus Elise of Frank Profera! http://data:image/jpeg;base64,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
LAR_6754.jpg
It may not be possible to get the exact power output of that car, just to let you know.
 
Kenji RHD Subaru WRX STi Wagon '00
377 hp (est.)/1300kg

Buy a Subaru IMPREZA Sport Wagon WRX STi Version VI '99.

Custom Parts:
BBS RE-MG (2 Inches Up) and paint them dark yellow (I used Mello Yello)

Tuning Parts:
FC Suspension
Engine Tuning Stage 1
Sports Computer
Sports Exhaust
Sports Exhaust Manifold
Intake Tuning
Window Weight Reduction

The Tune:
Suspension -
Ride Height: 120/120
Spring Rate: 7.00/5.00
Dampers C: 3/5
Dampers E: 4/6
Anti-Roll: 3/3
Camber: 3.0/3.5
Toe: 0/.2

Power -
Power Limiter: 377 hp

Stowe Circuit Time: 0:57.032
 
I am always intriqued by your replica tunes, I have only one question... where do you get the suspension tunes from? is it research to locate the actual spring rates or just tune to the drive to make it handle the best around the track?

If it is research, where are you finding this info, I have a rough time finding the stuff with google.
 
I am always intriqued by your replica tunes, I have only one question... where do you get the suspension tunes from? is it research to locate the actual spring rates or just tune to the drive to make it handle the best around the track?

If it is research, where are you finding this info, I have a rough time finding the stuff with google.
Me? Some of the suspension tunes are made up, but I got the spring rates for the Kenji WRX here: http://www.stance-usa.com/sus/products/coilovers/supersportplus
 
Me? Some of the suspension tunes are made up, but I got the spring rates for the Kenji WRX here: http://www.stance-usa.com/sus/products/coilovers/supersportplus
thanks.

I did a bunch of research on the new z/28, an interesting beast we don't have, and discovered the round about rates if the stock one I located is accurate and the 85% f 65% r stiffer is true. (http://www.motortrend.com/roadtests/coupes/1403_2014_chevrolet_camaro_z28_first_test/)


stock SS is about 8.41 kg/mm front 10.45 kg/mm rear
z/28 est 15.14 front 17.24 rear

I'll keep my eye peeled here for more awesomeness.
 
thanks.

I did a bunch of research on the new z/28, an interesting beast we don't have, and discovered the round about rates if the stock one I located is accurate and the 85% f 65% r stiffer is true. (http://www.motortrend.com/roadtests/coupes/1403_2014_chevrolet_camaro_z28_first_test/)


stock SS is about 8.41 kg/mm front 10.45 kg/mm rear
z/28 est 15.14 front 17.24 rear

I'll keep my eye peeled here for more awesomeness.
My tune uses those spring rates. Damper settings were made up though.
 
2013 Reiter Gallardo GT3 FL2
View attachment 113464
600hp/1,190kg

Custom parts:

Tuning Parts:

Racing Soft
FC Suspension
Racing Brakes
FC Transmission
Triple Plate Clutch
Carbon Drive Shaft
FC LSD
Torque Dristributing Center Dif.
Racing Exhaust
Weight Red. 3
The Tune:
Transmission

Set Max Speed to 330km/h
1: 2.563
2: 1.850
3: 1.423
4: 1.110
5: 0.867
6: 0.710
final: 4.907

Suspension -
Ride Height: 88/88
Spring Rate: 11.84/14.92
Dampers C: 3/3
Dampers E: 4/5
Anti-Roll: 5/5
Camber: 0.2/0.1
Toe: -0.41/0.26
Brakes: 4/4

LSD:
7/7
10/10
45/45

Torque Distrib: 35:65

Power -
Power Limiter: 600 hp

Ballast: 20kg
Position: 12%

Stowe Lap Time: 0:45:470
Not reachable gears and not very realistic, because the real one has rwd (I asked Reiter Engineering)
 

Latest Posts

Back