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8 oz of oil per gallon of gas

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Q: What is the proper oil gas mixture for a homelite XL-12 chainsaw?
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What are some of the best lightweight vacuums on the market?

The Simplicity Freedom, Oreck XL12, Meile Neptune and the Sebo K3 Volcano are some of the best lightweight vacuums on the market. All weighting 8 pounds-12 pounds. Bisell 2080 quick steamer power brush (easy to use, best value for its cost, has a lot of cleaning options. Simplicity Freedom is also a good choice with a weight of only 8 lbs. Sebo K3 maybe attractive to pet owners with its strong power head.


How do you determine an RMS value of a complex wave?

To explain the basics behind rms of complex waves and harmonics. Let V = Volt, I= Current, P = Average power, and rms or RMS as Route Mean Square (both are acceptable) and let e.m.f. be Electromotive Force. Then rms values for V or I can be obtained in the following manner. An electrical quantity such as V or I (be careful for P) in a pure sine wave will have a rms value of, lets use V as argument: Vrms = Vpeak/sqr(2) This mean that the rms is the average of the absolute value of the sine wave. Not of the sine wave it self. The average value of a sine wave is 0. It's important to know it is the absolute value. If we say for the sake of simplicity: i = I x sin(a+b) then i2 = I2.sin2(a+b) Since the average value is the sine amplitude divided by sqr(2), it makes sense to say that: average of sine2 = 1/2 [the square root falls away (sqr(2)2 = 2)] Thus, sin2(a+b) will have an average value of a 1/2, it will always be 1/2 since a sine wave will always have a peak value of 1 and 12 = 1 so let us say: An e.m.f produce a fundamental and another two harmonics, an e.m.f will normally produce odd harmonics such as 1st, 3rd and 5th i = I1.sin(a+b1) + I3.sin(a+b3) + I5.sin(a+b5) +..... In.sin(a+bn) i2rms = (1/2*I12)+(1/2*I32)+(1/2*I52)+...+(1/2*In2) remove the power from i irms = sqr[(1/2*I12)+(1/2*I32)+(1/2*I52)+...+(1/2*In2)] remove 1/2 as common and the result will be: irms = sqr[{(I12)+(I32)+(I52)+...+(In2)}/2] Or what appears to be more conventional, remove 1/2 and apply Sqr(2) below the line then it looks more like rms calculation :) irms = sqr[(I12)+(I32)+(I52)+...+(In2)] /sqr(2) Just another tip: I and V are done exactly the same but power is differenent since sqr(2) x sqr(2) = 2 and not sqr(2) so just to keep it simple do it as Pavr=Irms x Vrms so fist find Irms and Vrms before power, there might be short cut once you know this well, but for now it's best to do it like this and not to confuse you. To determine reactances and impedances, it's best to calculate each harmonic separately like XL1 = 2 x (pi) x f1 x L XL3 = 2 x (pi) x f3 x L XL5 = 2 x (pi) x f5 x L Z1=sqr(R2+XL12) Z3=sqr(R2+XL32) Z5=sqr(R2+XL52) Power due to harmonic is Ph = Eh(rms) x Ih(rms) x cos(a) where a is the V-I phase shift Ptotal = sum(Ph1+Ph3+Ph5+...) Then power factor PF= Ptotal / [Eh(rms) x Ih(rms)] Resonance is still at Xc=XL but only with individual harmonics, such as Xc1=XL1;Xc3=XL3;...