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Discrete Maths Last Minute questions (1 Viewer)

Drsoccerball

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Thanks mainly Integrand for saving me from dropping out of my degree by helping me in maths 1B but I need everyone's help just a bit longer for discrete maths.











 
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InteGrand

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Thanks mainly Integrand for saving me from dropping out of my degree by helping me in maths 1B but I need everyone's help just a bit longer for discrete maths.











3), Yeah, prime factorisation is unique. So every positive integer has only one prime factorisation. So if n_1 and n_2 have different prime factorisations, they cannot be the same number.
 

seanieg89

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lel LaTeX isn't working.
Claim:
A x (B u C) = (A x B) u (A x C)

If (x,y) is in the LHS then by definition x is in A and y is in either B or C.
If y is in B, then by definition (x,y) is in AxB. Similarly if y is in C then (x,y) is in AxC.
Hence LHS c RHS.

If (x,y) is in the RHS then either x is in A and y is in B, or x is in A and y is in C.
In either of these cases, x is in A and y is in BuC. Hence RHS c Ax(BuC) = LHS.

Hence LHS=RHS.
 

InteGrand

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Suppose a and b are congruent mod m, then we can write a = b + km for some integer k. Now, let d1 = gcd(a,m), and let d2 = gcd(b,m). Since d2 | b and d2 | m, we have d2 | (b + km), so d2 | a. So d2 divides both a and m, so d2 ≤ d1. A similar argument shows d1 ≤ d2 (since b = a + Km, where K = -k). So d1 = d2, as required.
 
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Drsoccerball

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Don't worry about the first question but the second is messed up

nvm got it.
 
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Drsoccerball

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A security agency sends messages using 12 letter code words, made up using the 26 letters of the English alphabet.

How many words contain at least one X and at least one Y and at least one Z?

I had :



Answer:
 

InteGrand

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A security agency sends messages using 12 letter code words, made up using the 26 letters of the English alphabet.

How many words contain at least one X and at least one Y and at least one Z?

I had :



Answer:
What was the reasoning for your answer? You can use the inclusion/exclusion principle to get the answer.
 

Drsoccerball

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What was the reasoning for your answer? You can use the inclusion/exclusion principle to get the answer.
That's what I did.

Unrestricted - (If 1 of the letters is in it) + (if pairs of the letters are in it)
 

Drsoccerball

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Also I am doing past papers and circling questions I cant do Ill post them here after I finish all of em
 

leehuan

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^Why is it that virtually all of them are from the past paper book lol


But in regards to Q2, I also have that problem.

 

InteGrand

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How is this a necessary condition?
What necessary condition? Q3 is just asking for an example.

An example would be f:R->R, f(x) = sin(x), with A = [0, 2*pi] and B = [2*pi, 4*pi].

Then f(A) = [-1,1] = f(B), but A∩B = {2*pi}. So f(A∩B) = {sin(2*pi)} = {0}, whereas f(A)∩f(B) = [-1,1].
 

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