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- How do I know when to use let and suppose in a proof?
I often use 'suppose' when my goal is to derive a contradiction, and 'let' when I instantiate a variable when I'm not going to derive a contradiction I'm not sure if this is standard
- Suppose $f: [a,b]\to\mathbb {R}$ is Riemann integrable. Prove that . . .
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- Let $H$ be a subgroup of a group $G$ and suppose that $g_1,g_2 ∈ G . . .
I have now gotten answers for (a) implying (e) and (e) implying (d) I'm overthinking all of this and am still confused about (d) implying (c) and (c) implying (b) When it comes to (b) implying (a), I thought I was getting somewhere but it doesn't seem to be working
- Suppose $v_1,. . . ,v_m$ is linearly independent in $V$ and $w \in V . . .
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- probability - Poisson Distribution of sum of two random independent . . .
You can use Probability Generating Function (P G F) As poisson distribution is a discrete probability distribution, P G F fits better in this case For independent X
- Suppose $V$ is finite-dimensional and $T_1,T_2∈L(V,W)$. Prove that . . .
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- Suppose $CA=I_n$ (the $n \times n$ identity matrix. Show that the . . .
Does this answer your question? Linear Algebra - Suppose $CA=I_n$ Show that the equation $Ax = 0$ has only the trivial solution
- Suppose $n$ is an even positive integer and $H$ is a subgroup of . . .
Suppose $n$ is an even positive integer and $H$ is a subgroup of $\mathbb Z n\mathbb Z$ Prove that either every element of $H$ is even or exactly half of its elements are even
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