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Highest Common Factor
Jubiya
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∙ 13y agoGREATEST common factor
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What math words can you make from these letters a e f g h i m r s t u?
rate, math,s
What is the answer to math superstars III Saturn vii question 7?
The answer is 2=E 1=f 7=G 8=H.
What the h in math stand for?
Math is an abbreviation of mathematics: it is not an acronym. So the h does not stand for anything!
Formula for instantaneous speed?
lim as h->0 of (f(x+h) - f(x))/h or lim as x->a of (f(x) - f(a))/(x - a)
Does h of x mean the same thing as Function of x also known as f of x?
Yes, h(x) is simply a function h --> x, like f(x) is a function f --> x. The different letters are used to illustrate the fact that the two functions need not be the same.
What does a b c d e f g h mean?
NothingA b c d e f g h does not have a meaning. They are the first 8 letters of the Engish alphabet.
What does F L H R C mean?
HArley Davidson Road King Classic
Enter the follow bonds in order of increasing bond stretching frequency C-H F-H O-H N-H?
C-h < n-h < o-h < f-h
What has the author H C F Holgate written?
H. C. F. Holgate has written: 'Foreign exchange accounts for bankers'
What kind of force does CH3F have?
Dipole-dipole because the H is not connected with F IT would be H | H- C - F | H
What are the clarinet notes for the song When You Were Here?
c c c d f c f g B natural f g h
What has the author F H C Kelly written?
F. H. C Kelly has written: 'Practical mathematics for chemists' -- subject(s): Mathematics
How to prove that differentiating in the space of smooth functions is a linear transformation?
Recall that a linear transformation T:U-->V is one such that 1) T(x+y)=T(x)+T(y) for any x,y in U 2) T(cx)=cT(x) for x in U and c in R All you need to do is show that differentiation has these two properties, where the domain is C^(infinity). We shall consider smooth functions from R to R for simplicity, but the argument is analogous for functions from R^n to R^m. Let D by the differential operator. D[(f+g)(x)] = [d/dx](f+g)(x) = lim(h-->0)[(f+g)(x+h)-(f+g)(x)]/h = lim(h-->0)[f(x+h)+g(x+g)-f(x)-g(x)]/h (since (f+g)(x) is taken to mean f(x)+g(x)) =lim(h-->0)[f(x+h)-f(x)]/h + lim(h-->0)[g(x+h) - g(x)]/h since the sum of limits is the limit of the sums =[d/dx]f(x) + [d/dx]g(x) = D[f(x)] + D[g(x)]. As for ths second criterion, D[(cf)(x)]=lim(h-->0)[(cf)(x+h)-(cf)(x)]/h =lim(h-->0)[c[f(x+h)]-c[f(x)]]/h since (cf)(x) is taken to mean c[f(x)] =c[lim(h-->0)[f(x+h)-f(x)]/h] = c[d/dx]f(x) = cD[f(x)]. since constants can be factored out of limits. Therefore the two criteria hold, and if you wished to prove this for the general case, you would simply apply the same procedure to the Jacobian matrices corresponding to Df.
What word can you make H I L F F C?
cliff, hic, flic
Is C---H F a hydrogen bond?
sdOU GYSEJHFKDC
What is Velocity of a light wave?
c= f x h
What does hydrofluorocarbon refrigerant contain?
These elements are C. H, F.
