In the epicyclic gear train shown in Fig.15.36, the compound wheels E and F rotate freely on shaft A which carries the planet carrier G. The planets B and C are compounded gears. The number of teeth on each gear are: z_{e}=30 ; z_{b}=20, z_{c}=18, z_{d}=68.
The shafts A and K rotate in the same direction at 250 rpm and 100 rpm respectively. Determine the speed of shaft J.
Question 15.32: In the epicyclic gear train shown in Fig.15.36, the compound...
Table 15.29 is used to find the speed of gears.
z_{f}=z_{c}+z_{d}-z_{b}=18+68-20=66 .
n_{a}=n_{g}= y =250 .
n_{e}=n_{h} \times 15 / 30=-100 \times 15 / 30=-50 .
x+y=-50 .
x=-300 .
n_{j}=n_{d}=y+297 x / 340=250+(297 / 340)(-300) .
= –12.06 rpm, i.e. 12.06 rpm cw.
| Table 15.29 | ||||
| Revolutions of | Operation | |||
| Gear D, 68 | Gear B/C, 20, 18 | Gear E/F, 30, 66 | Arm, G | |
| -z / z_{b} \times\left(-z_{c} / z_{d}\right)=
-(33 / 10) \times(-18 / 68)=297 / 340 |
-z / z_{b}=-66 / 20
=-3.3 |
+1 | 0 | 1. Arm fixed,+1 rev to E ccw |
| 297x/340 | -3.3x | +x | 0 | 2. Multiply by x |
| y + 297x/340 | y-3.3x | y+x | y | 3. Add y |
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