(a) Overview. This section contains equations and example calculations for statistics that are specified in this part. In this section we use the letter “y” to denote a generic measured quantity, the superscript over-bar ““ to denote an arithmetic mean, and the subscript “ref” to denote the reference quantity being measured.

(b) Arithmetic mean. Calculate an arithmetic mean, , as follows:

eCFR graphic er30ap10.003.gif

Example:    

N = 3

y1 = 10.60

y2 = 11.91

yN = y3 = 11.09

eCFR graphic er30ap10.004.gif

= 11.20

(c) Standard deviation. Calculate the standard deviation for a non-biased (e.g., N-1) sample, σ, as follows:

eCFR graphic er13jy05.024.gif

Example:    

N = 3

y1 = 10.60

y2 = 11.91

yN = y3 = 11.09

= 11.20

eCFR graphic er13jy05.025.gif

σy = 0.6619

(d) Root mean square. Calculate a root mean square, rmsy, as follows:

eCFR graphic er13jy05.026.gif

Example:    

N = 3

y1 = 10.60

y2 = 11.91

yN = y3 = 11.09

eCFR graphic er13jy05.027.gif

rmsy = 11.21

(e) Accuracy. Determine accuracy as described in this paragraph (e). Make multiple measurements of a standard quantity to create a set of observed values, yi, and compare each observed value to the known value of the standard quantity. The standard quantity may have a single known value, such as a gas standard, or a set of known values of negligible range, such as a known applied pressure produced by a calibration device during repeated applications. The known value of the standard quantity is represented by yrefi . If you use a standard quantity with a single value, yrefi would be constant. Calculate an accuracy value as follows:

eCFR graphic er30ap10.005.gif

Example:    

yref = 1800.0

N = 3

y1 = 1806.4

y2 = 1803.1

y3 = 1798.9

eCFR graphic er30ap10.006.gif

eCFR graphic er30ap10.007.gif

accuracy = 2.8

(f) t-test. Determine if your data passes a t-test by using the following equations and tables:

(1) For an unpaired t-test, calculate the t statistic and its number of degrees of freedom, v, as follows:

eCFR graphic er28ap14.010.gif

(2) For a paired t-test, calculate the t statistic and its number of degrees of freedom, v, as follows, noting that the εi are the errors (e.g., differences) between each pair of yrefi and yi:

eCFR graphic er28ap14.011.gif

eCFR graphic er28ap14.012.gif

Table 1 of §1065.602—Critical t Values Versus Number of Degrees of Freedom, v1

Open Table
ν Confidence
90% 95%
1 6.314 12.706
2 2.920 4.303
3 2.353 3.182
4 2.132 2.776
5 2.015 2.571
6 1.943 2.447
7 1.895 2.365
8 1.860 2.306
9 1.833 2.262
10 1.812 2.228
11 1.796 2.201
12 1.782 2.179
13 1.771 2.160
14 1.761 2.145
15 1.753 2.131
16 1.746 2.120
18 1.734 2.101
20 1.725 2.086
22 1.717 2.074
24 1.711 2.064
26 1.706 2.056
28 1.701 2.048
30 1.697 2.042
35 1.690 2.030
40 1.684 2.021
50 1.676 2.009
70 1.667 1.994
100 1.660 1.984
1000 + 1.645 1.960

1Use linear interpolation to establish values not shown here.

(g) F-test. Calculate the F statistic as follows:

eCFR graphic er13jy05.036.gif

Example:     eCFR graphic er13jy05.037.gif

eCFR graphic er13jy05.038.gif

eCFR graphic er13jy05.039.gif

F = 1.268

(1) For a 90% confidence F-test, use Table 2 of this section to compare F to the Fcrit90 values tabulated versus (N−1) and (Nref−1). If F is less than Fcrit90, then F passes the F-test at 90% confidence.

(2) For a 95% confidence F-test, use Table 3 of this section to compare F to the Fcrit95 values tabulated versus (N−1) and (Nref−1). If F is less than Fcrit95, then F passes the F-test at 95% confidence.

eCFR graphic er13jy05.017.gif

eCFR graphic er13jy05.018.gif

(h) Slope. Calculate a least-squares regression slope, a1y, as follows:

eCFR graphic er15se11.021.gif

Example:    

N = 6000

y1 = 2045.8

= 1050.1

yref 1 = 2045.0

ref = 1055.3

eCFR graphic er15se11.022.gif

a1y = 1.0110

(i) Intercept. Calculate a least-squares regression intercept, a0y, as follows:

eCFR graphic er13jy05.042.gif

Example:    

= 1050.1

a1y = 1.0110

ref = 1055.3

a0y = 1050.1 − (1.0110 · 1055.3)

a0y = −16.8083

(j) Standard estimate of error. Calculate a standard estimate of error, SEE, as follows:

eCFR graphic er25oc16.308.gif

Eq. 1065.602-11

Example:    

N = 6000

y1 = 2045.8

a0y = -16.8083

a1y = 1.0110

yref1 = 2045.0

eCFR graphic er25oc16.313.gif

SEEy = 5.348

(k) Coefficient of determination. Calculate a coefficient of determination, r2, as follows:

eCFR graphic er13jy05.045.gif

Example:    

N = 6000

y1 = 2045.8

a0y = −16.8083

a1y = 1.0110

yrefi = 2045.0

= 1480.5

eCFR graphic er13jy05.046.gif

eCFR graphic er13jy05.174.gif

(l) Flow-weighted mean concentration. In some sections of this part, you may need to calculate a flow-weighted mean concentration to determine the applicability of certain provisions. A flow-weighted mean is the mean of a quantity after it is weighted proportional to a corresponding flow rate. For example, if a gas concentration is measured continuously from the raw exhaust of an engine, its flow-weighted mean concentration is the sum of the products of each recorded concentration times its respective exhaust molar flow rate, divided by the sum of the recorded flow rate values. As another example, the bag concentration from a CVS system is the same as the flow-weighted mean concentration because the CVS system itself flow-weights the bag concentration. You might already expect a certain flow-weighted mean concentration of an emission at its standard based on previous testing with similar engines or testing with similar equipment and instruments. If you need to estimate your expected flow-weighted mean concentration of an emission at its standard, we recommend using the following examples as a guide for how to estimate the flow-weighted mean concentration expected at the standard. Note that these examples are not exact and that they contain assumptions that are not always valid. Use good engineering judgment to determine if you can use similar assumptions.

(1) To estimate the flow-weighted mean raw exhaust NOX concentration from a turbocharged heavy-duty compression-ignition engine at a NOX standard of 2.5 g/(kW · hr), you may do the following:

(i) Based on your engine design, approximate a map of maximum torque versus speed and use it with the applicable normalized duty cycle in the standard-setting part to generate a reference duty cycle as described in §1065.610. Calculate the total reference work, Wref, as described in §1065.650. Divide the reference work by the duty cycle's time interval, Δtdutycycle, to determine mean reference power, Pref.

(ii) Based on your engine design, estimate maximum power, Pmax, the design speed at maximum power, fnmax, the design maximum intake manifold boost pressure, pinmax, and temperature, Tinmax. Also, estimate a mean fraction of power that is lost due to friction and pumping, frict. Use this information along with the engine displacement volume, Vdisp, an approximate volumetric efficiency, ηV, and the number of engine strokes per power stroke (two-stroke or four-stroke), Nstroke, to estimate the maximum raw exhaust molar flow rate, exhmax.

(iii) Use your estimated values as described in the following example calculation:

eCFR graphic er15se11.023.gif

Example:    

eNOx = 2.5 g/(kW · hr)

Wref = 11.883 kW · hr

MNOx = 46.0055 g/mol = 46.0055 · 10−6 g/µmol

Δtdutycycle = 20 min = 1200 s

ref = 35.65 kW

frict = 15%

Pmax = 125 kW

pmax = 300 kPa = 300,000 Pa

Vdisp = 3.0 l = 0.0030 m3/r

fnmax = 2,800 r/min = 46.67 r/s

Nstroke = 4

ηV = 0.9

R = 8.314472 J/(mol · K)

Tmax = 348.15 K

eCFR graphic er15se11.024.gif

exhmax = 6.53 mol/s

eCFR graphic er15se11.025.gif

exp = 189.4 µmol/mol

(2) To estimate the flow-weighted mean NMHC concentration in a CVS from a naturally aspirated nonroad spark-ignition engine at an NMHC standard of 0.5 g/(kW · hr), you may do the following:

(i) Based on your engine design, approximate a map of maximum torque versus speed and use it with the applicable normalized duty cycle in the standard-setting part to generate a reference duty cycle as described in §1065.610. Calculate the total reference work, Wref, as described in §1065.650.

(ii) Multiply your CVS total molar flow rate by the time interval of the duty cycle, Δtdutycycle. The result is the total diluted exhaust flow of the ndexh.

(iii) Use your estimated values as described in the following example calculation:

eCFR graphic er13jy05.051.gif

Example:    

eNMHC = 1.5 g/(kW · hr)

Wref = 5.389 kW · hr

MNMHC = 13.875389 g/mol = 13.875389 · 10−6 g/µmol

dexh = 6.021 mol/s

Δtdutycycle = 30 min = 1800 s

eCFR graphic er13jy05.052.gif

NMHC = 53.8 µmol/mol

[70 FR 40516, July 13, 2005, as amended at 73 FR 37324, June 30, 2008; 75 FR 23044, Apr. 30, 2010; 76 FR 57452, Sept. 15, 2011; 79 FR 23779, Apr. 28, 2014; 81 FR 74170, Oct. 25, 2016]


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