1. What is wrong with the following proof that shows all integers are equal? (Please explain which step in this proof is incorrect and why is it so.) Let P(n) be the proposition that all the numbers in any set of size n are equal. 1) Base case: P(1) is clearly true. 2) Now assume that P(n) is true. That is for any set of size n all the numbers are the same. Consider any set of n + 1...
Explain Mill’s Proof of what is right and good.
If you use a statement or theorem, please proof it first or
explain how to proof it, thanks in advance
ne Z? 1.13 Let p > 3 be a prime number. Show that p=6k+ 1 or p = 6k +5 for some k e Z. - - L OL. 1 . ait diricible bu
Why is the answer A? Please explain
clearly.
Why is the answer A? Please explain
clearly.
Why is the answer A? Please explain
clearly.
Why is the answer A? Please explain
clearly.
Why is the answer A? Please explain
clearly.
Why is the answer A? Please explain
clearly.
Why is the answer A? Please explain
clearly.
Why is the answer A? Please explain
clearly.
Why is the answer A? Please explain
clearly.
Why is the answer A? Please explain
clearly....
Need help figuring out this proof. Please show all work and
explain if you can.
1. Suppose A is a matrix such that A2 -A. Prove that A is either 0 or 1
(Mathematical analysis
w/ proof)
please explain and
don't skip any steps
Prove that f(x) = x + lis uniformly continuous on (0, 2 - 1
4 Explain intuitively why Z[V2] Z[V3]. Back your intuition with a proof. [Note: this example not only says that a +bv2 a +bv3 is not an isomorph ism. It says that no isomorphism can be found at all-no matter how clever a choice of mapping you might try to make.] Hint; Intuition: ZV2] has an element whose square is 1+1 (i.e. 2); Z[3] surely hasn't? Proof: For any isomorphism 0 we'd have 0(1)-1 hence (2)=2. Suppose 02)=a+ b/3. Then 2=(a+b/3)
What is the charge of proteins inside a neuron? please explain why
From the proof of (ii) . Explain/Show why -n+ 1Sm-kn-1 is true by construction. . Explain/Show why 0 is the only number divisible by n in the range -n+1 ton-1 Proposition 6.24. Fix a modulus nEN. (i) is an equivalence relation on Z. (ii) The equivalence relation-has exactly n distinct equivalence classes, namely (ii) We need to prove that every integer falls into one of the equivalence classes [0], [1],..., [n -1], and that they are all distinct. For each...
please explain to me what is Thermoregulation and why is it important.And please refer to any outside sources or references APA Style