10Speed
Clutch schedule for a 10speed transmission
Libraries:
Simscape /
Driveline /
Transmissions
Description
The 10Speed transmission block consists of four planetary gear sets and six clutches. The follower shaft connects to the planet gear carrier of the fourth planetary gear. Four of the clutches determine the power flow path for the base shaft. The other two clutches serve as brakes, grounding various gears of the planetary sets to the transmission housing.
This diagram shows a 10speed transmission. The labels for the gear components are superimposed on the input and output gears. The table lists the gear and clutch components that are labeled in the diagram. Power elements are shown in orange. Braking elements are shown in black.
Label  Component 

PG1–PG4  Planetary gears, 1–4 
R_{x}  Ring gear of planetary gear x 
C_{x}  Planet gear carrier of planetary gear x 
S_{x}  Sun gear of planetary gear x 
C, D, E, F  Clutches that control the power flow path 
A, B  Braking clutches 
Drive Ratios, Clutch Schedule, and Power Flow
The drive ratio between the transmission input and output shafts follows from the elementary gear ratios specified for the gear blocks. The elementary gear ratios are
$${g}_{x}=\frac{{N}_{{R}_{x}}}{{N}_{{S}_{x}}},$$
where:
N_{Rx} is the number of teeth in the planetary ring gear x, where x = 1, 2, 3, and 4.
N_{Sx} is the number of teeth in the planetary sun gear x, where x = 1, 2, 3, and 4
The table shows the clutch schedule, driveratio expressions, driveratio default values, and the powerflow diagrams for each gear of the 10Speed block. The schedule and gear ratios are based on the manufacturer data for a 10R80 10speed automatic transmission.
The letters in the clutch schedule columns denote the brakes and clutches. A value
of 1
denotes a locked state and a value of 0
an unlocked state. The clutch schedule generates these signals based on the Gear
port input signal. The signals are scaled through a Gain block and used as actuation
inputs in the clutch blocks.
The powerflow diagrams show the power flow paths between input and output shafts for each gear setting. Power flow is shown in orange. Connections to the transmission housing (a mechanical ground) are shown in black.
Gear  Clutch Schedule  Drive Ratio Equation  Default Ratio  Power Flow  

A  B  C  D  E  F  
10  0  1  1  1  0  1  $$\frac{{g}_{2}}{1+{g}_{2}}$$  0.64 

9  0  1  1  0  1  1  $$\frac{{g}_{2}\left(1+{g}_{4}\right)}{\left({g}_{2}\left(1+{g}_{4}\right)\right)+{g}_{4}}$$  0.69 

8  0  1  0  1  1  1  $$\frac{{g}_{2}\left(1+{g}_{3}\right)\left(1+{g}_{4}\right)}{\left({g}_{2}\left(1+{g}_{3}\right)\left(1+g4\right)\right)+{g}_{4}}$$  0.85 

7  0  0  1  1  1  1  $$1$$  1 

6  1  0  0  1  1  1  $$\frac{\left(1+{g}_{4}\right)\left(1+{g}_{1}+{g}_{2}\left(1+{g}_{3}\right)\right)}{\left(1+{g}_{4}\right)\left(1+{g}_{2}\left(1+{g}_{3}\right)\right)+{g}_{1}}$$  1.27 

5  1  0  1  0  1  1  $$\frac{\left(1+{g}_{1}+{g}_{2}\right)\left(1+{g}_{4}\right)}{\left(1+{g}_{2}\right)\left(1+{g}_{4}\right)+g1}$$  1.52 

4  1  0  1  1  0  1  $$\frac{1+{g}_{1}+{g}_{2}}{1+{g}_{2}}$$  1.76 

3  1  0  1  1  1  0  $$\frac{\left(1+{g}_{1}\right)\left(1+{g}_{4}\right)}{1+{g}_{1}+{g}_{4}}$$  2.14 

2  1  1  1  1  0  0  $$\frac{{g}_{2}\left(1+{g}_{4}\right)}{1+{g}_{2}}$$  2.99 

1  1  1  0  1  1  0  $$1+{g}_{4}$$  4.70 

R  1  1  0  1  0  1  $$\frac{{g}_{2}{\text{g}}_{\text{3}}\left(\text{1}+{\text{g}}_{\text{4}}\right)}{\left(\text{1}+{\text{g}}_{\text{2}}\right)}$$  4.79 

Examples
Ports
Input
Conserving
Parameters
Extended Capabilities
Version History
Introduced in R2018a
See Also
4Speed CRCR  4Speed Ravigneaux  6Speed Lepelletier  7Speed Lepelletier  8Speed  9Speed