Electric vehicle

Modelling Vehicle Acceleration

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Electric Vehicle Technology Explained, Second Edition ( PDFDrive )

8.3
Modelling Vehicle Acceleration
8.3.1 Acceleration Performance Parameters
The acceleration of a car or motorcycle is a key performance indicator, though there is no standard measure used. Typically the time to accelerate from standstill to 60 mph, or or 50 kph, will be given. The nearest to such a standard for electric vehicles are the and 0–50 kph times, though these times are not given for all vehicles.
Such acceleration ﬁgures are found from simulation or testing of real vehicles. For IC
engine vehicles this is done at maximum power. Similarly, for electric vehicles performance simulations are carried out at maximum torque.
We have already seen in Chapter 7 that the maximum torque of an electric motor is a fairly simple function of angular speed. Inmost cases, at low speeds, the maximum torque is a constant, until the motor speed reaches a critical value
ω
c
after which the torque falls.

192
Electric Vehicle Technology Explained, Second Edition
In the case of a brushed shunt or permanent magnet (PM) DC motor the torque falls linearly with increasing speed. In the case of most other types of motor, the torque falls in such away that the power remains constant.
The angular velocity of the motor depends on the gear ratio G and the radius of the drive wheel r as in Equation (8.6) derived above. So, we can say that
For
ω < ω
c
, or v <
r
G
ω
c
, then
T
= T
max
Once this constant torque phase is passed, that is
ω
≥ ω
c
, or
v
≥ (r/G) ω
c
, then either
the power is constant, as inmost brushless type motors, and we have
T
=
T
max
ω
c
ω
=
rT
max
ω
c
Gν
(8.10)
or the torque falls according to the linear equation we met in Section 7.1.2:
T
= T
0
− kω
which, when Equation (8.6) is substituted for angular speed, gives
T
= T
0
−
kG
r
v
(8.11)
Now that we have the equations we need, we can combine them in order to ﬁnd the acceleration of a vehicle. Many of these equations may look quite complex, but nearly all the terms are constants, which can be found or estimated from vehicle or component data.
For a vehicle on level ground, with air density 1.25 kg m, Equation (8.9) becomes
F
te
= μ
rr
mg
+ 0.625AC
d
ν
2
+ ma + I
G
2
η
g
r
2
a
Substituting Equation (8.5) for F
te
, and noting that
a
= dν/dt, we have
G
r
T
= μ
rr
mg
+ 0.625AC
d
ν
2
+

m
+ I
G
2
η
g
r
2

dν
dt
(8.12)
We have already noted that T , the motor torque, is either a constant or a simple function of speed Equations (8.10) and (8.11)]. So, Equation (8.13) can be reduced to a differential equation, of ﬁrst order, for the velocity v . Thus the value of v can be found for any value of t .
For example, in the initial acceleration phase, when
T
= T
max
, Equation (8.12) becomes
G
r
T
max
= μ
rr
mg
+ 0.625AC
d
v
2
+

m
+ I
G
2
η
g
r
2

dv
dt
(8.13)
Provided all the constants are known, or can reasonably be estimated, this is a very straightforward ﬁrst-order differential equation, whose solution can be found using many modern calculators, as well as a wide range of personal computer programs. This is also possible for the situation with the larger motors. Two examples will hopefully make this clear.

Electric Vehicle Modelling

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