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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 $v_1,. . . ,v_m$ is linearly independent in $V$ and $w \in V . . .
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- Suppose $f: [a,b]\to\mathbb {R}$ is Riemann integrable. Prove that . . .
Continue to help good content that is interesting, well-researched, and useful, rise to the top! To gain full voting privileges,
- 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
- 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
- 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 $f \geq 0$, if continuous on [a,b] and $\int_ {a}^ {b} f (x)dx . . .
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