A good alignment will make your car handle, brake, and accelerate better for very little investment. You'll even save money by reducing tire wear with a simple correction to the camber and toe.
What is Camber Angle?
![](data:image/png;base64,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)
Camber is a measurement of the centerline of your wheel/tire relative to the road surface. It is expressed in degrees and greatly affects the handling dynamics of the car.
Negative Camber
Negative camber is when the top of the tire tucks inwards. For a normal car you typically want to maintain a slight amount of negative camber (0.5 - 1°) to have a good balance of cornering grip, braking grip, and tire wear. On most vehicles it's common to have slightly more negative camber (0.8 - 1.3°) in the rear to reduce the chances of oversteer (loss of grip in rear).
Benefits of Negative Camber
Negative camber improves handling by keeping the tire perpendicular to the road as the car rolls; ensuring that the tire's contact patch is evenly loaded. Without adequate negative camber the tire would load the outer portion of the tire and produce less grip.
Downsides of Negative Camber
Adding negative camber will reduce the peak tire grip during straight-line acceleration and braking. It's important to have a healthy balance to ensure good overall performance. For most cars this is around 2 - 3° of negative camber.
Static vs. Dynamic Camber
Static camber is the amount of camber angle the vehicle has at a rest, and is what gets measured when you get an alignment.
Dynamic camber is the momentary amount of camber angle generated as the vehicle accelerates, brakes, and goes around corners. Dynamic camber is the static camber plus or minus the "camber gain." Camber gain is rarely linear and is a result of suspension design and geometry. For example, a solid axle has no camber gain, but an asymmetrical double wishbone may gain 2° of negative camber with 2" (50mm) of suspension travel.
Camber Gain
Different suspension designs will result in varied camber gain curves, and even two similar designs can result in widely varied camber gain. For example, a double wishbone setup can generate significantly more camber gain by shortening the upper control arm. Here's a couple more examples:
How Much Static Camber Should I Run?
The ideal amount of camber for handling performance comes from a couple of variables:
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Tire Grip
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Suspension Geometry & Design
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Weight Distribution
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Road Conditions
Put simply, the amount of suspension travel and how much camber is gained as the suspension travels will dictate how much static camber you need to run.
As a rough guide, here's a list of camber settings for various suspension layouts and vehicles. This is meant to be a good starting point for a street car setup, but will require adjustment to fit your needs and vehicle specifics.
Note: these settings are meant to be a good starting place for a street car with street radials. Your vehicle may prefer more or less camber.
Front Camber Setting
DRIVE LAYOUT |
SUSPENSION TYPE |
CAMBER ANGLE |
FWD |
MacPherson Strut
Double Wishbone |
2.0°
1.5° |
RWD |
MacPherson Strut
Double Wishbone |
2.5°
2.0° |
AWD |
MacPherson Strut
Double Wishbone |
2.5°
2.0° |
4WD |
MacPherson Strut
Double Wishbone |
1.0°
1.0° |
Rear Camber Setting
DRIVE LAYOUT |
SUSPENSION TYPE |
CAMBER ANGLE |
FWD |
Multilink
Trailing Arm
Twist Beam |
1.0°
1.0°
1.0° |
RWD |
Multilink
Trailing Arm
Twist Beam |
1.0°
1.0°
1.3° |
AWD |
Multilink
Double Wishbone
Trailing Arm |
1.0°
1.0°
1.0° |
4WD |
Multilink
Double Wishbone
Trailing Arm |
0.5°
0.5°
0.5° |
Race teams will know how much camber to dial into their car from thermal tire data (tire tread temps), tire wear patterns, previous track experience, and driver feedback. Well-funded teams will have additional data from load cells, shock travel, acceleration sensors, images, and onboard telemetry using thermal cameras.
At proper camber settings the tire will exhibit stable and symmetrical temperatures across the tire surface during cornering. Excessive heating on the inner or outer third of the tire can be indicative of improper camber angle, although not conclusively.
Road conditions can also demand more or less camber. Loose gravel and wet pavement both limit the amount of overall tire grip available, which necessitates less static camber. Banked corners at NASCAR oval tracks require asymmetrical camber setups with positive camber on the LF tire and considerable negative camber on the RF (outer) tire.
Camber Settings for Drift Cars
Drifting requires a rather unique setup since it pairs the need for good tire life and performance. The front camber will mimic a road race setup at around 3 - 4° to maximize lateral grip ("side bite"). Modified steering geometries (spindles, tie rods, etc.) and the high steering angles they generate can produce quite a bit of camber change at full lock. It's important that the static setup compliments this and any other bump geometry.
The rear should have near zero camber to provide strong forward grip and more importantly, to last quite a bit longer. By using the entire tread face you will evenly distribute pressure along the tire and heat it more uniformly. Both of these things will contribute to a lot more fun-per-tire (reduced tire wear), but at the cost of needing more power than running say 5° of camber and nuking the inner edge.
Positive Camber
Positive camber is when the top of the tire extends outward, and the base of the tire tucks inwards. This is rarely ever seen on a road car since it will reduce road handling capability. In special situations, such as NASCAR, positive camber will be applied to handle heavy amounts of track embankment. If you are running a positive camber figure on your street car then its highly recommended that you inspect your suspension for damage and/or adjust the camber to a slight negative figure.
Vintage Vehicles
Older vehicles can have very unique needs depending on their suspension design. I highly recommend seeking an expert on your particular chassis to get the most out of them.
Camber Settings with Bias Ply Tires
Bias ply tires react very differently to camber angle due to the differences in their construction compared to radials. Using the above recommendations, which are meant for radials, can result in lackluster results. Typically, you will run a bias ply tire with considerably less camber. Again, I recommend consulting an expert for further assistance on your vintage setup.
What is Caster Angle?
![](data:image/png;base64,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)
Caster is the measure of how far forward or behind the steering axis is to the verticle axis, viewed from the side. An example of caster in action is the front wheels on a shopping cart. They run a large amount of positive caster to make the cart track straight without wandering. However, the method that the cart uses (displacement caster) is different than how your car develops its caster angle (angled pivot), but the effect is the same.
Positive Caster
Positive caster is when the steering axis is in front of the verticle. In a road car, this would mean that the top of the coilover would be pushed towards the rear of the car. Positive caster creates a lot of align torque (the force that straightens the steering wheel when you go forward) which improves straight line stability of the car. Due to the geometry of positive caster it also will increase negative camber gain (a good thing) when turning. As you increase positive caster the steering will get heavier also, but with modern power steering systems this is rarely a problem. Generally you want as much positive caster as you can reasonably get so long as the car is equipped with power steering.
Positive caster angles run between 3 - 5° on modern vehicles. This gives a good mix of highway stability and steering feel. For a more performance oriented setup on a MacPherson strut you can add a degree or two to have more favorable camber gain at high steering angles.
If you are not running power steering, a caster setting of 3 - 4° is a good setup to reduce the weight of the steering and maintain the benefits of positive caster angle.
Negative Caster
Negative caster is when the steering axis is behind the vertical. This is generally only found on older vehicles due to tire technology, chassis dynamics, and other reasons. Modern vehicles do not use negative caster. It will lighten the steering effort but also increases the tendency for the car to wander down the road. If you've ever pushed a shopping cart then you've felt the effects of negative caster on the front wheels.
Regardless of what caster setting you use, make sure that your caster is symmetrical. Running a different amount of caster on one side will cause the car to pull towards the side with less caster.
What is Toe Angle?
![](data:image/png;base64,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)
Toe is the measure of how far inward or outward the leading edge of the tire is facing, when viewed from the top. Toe is measured in degrees and is generally a fraction of a whole degree. It has a large effect on how the car reacts to steering inputs as well as on tire wear. Aggressive toe angle will cause the tire to develop feathering across its surface.
Toe In
Toe-in is when the leading part of the tire is turned inwards towards the center of the car. This makes the tires want to push inward, which acts to improve straight line stability of the car as its traveling down the road, particularly at high speed (highway).
Toe Out
Toe-out is when the leading part of the tire is turned outwards away from the center of the car. This makes the tires want to separate from each other. This improves turn-in response considerably, but at the cost of tire wear. Running toe-out in the rear is generally not recommended since it will make the car want to pivot (oversteer) at all steering angles, but in the right setup it can help (auto-x / technical tracks) particularly if the rear toe bumps in.