- What does it mean to suppose a proposition in proofs?
I interpret the word "suppose" as being adequate only for the first category of propositions It makes sense to "suppose" that a proposition is either T or F if that proposition can be T in some scenarios but F in others However, it does not make any sense to me to say "suppose p(x)" if p is a proposition of the second category
- Suppose $f$ and $g$ are entire functions, and $|f(z)|≤|g(z)||f(z)|≤|g(z . . .
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- real analysis - Suppose $f(0),f(1),. . . ,f(10)$ are in a geometric . . .
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- How do I know when to use let and suppose in a proof?
Suppose n and m are natural numbers" or "Let n and m be arbitrary natural numbers " The boundary between "let" and "suppose" feels blurry When do I use "let" and "suppose" in a math proof?
- Suppose $A$, $B$, and $C$ are sets. Prove that $A B ⊆ C \\iff A ∪ C = B . . .
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- vector spaces - Suppose $a \in \mathbb F, v \in V$, and $av=0$. Prove . . .
Suppose B is a vector and equal to (a,b,c,d) 5 Checking my Understanding of and Motivation behind Tensors
- linear algebra - Suppose $v, w \in V$ where $V$ is a vector space . . .
Suppose 푆 is a nonempty set Define a natural addition and scalar multiplication on$푉^푆$, and show that $푉^푆$ is a vector space Hot Network Questions
- complex analysis - Suppose $f$ is holomorphic and bounded on the upper . . .
I can't seem to see why this should be true By Riemann Mapping Theorem we know $\\mathbb{H}$ (upper half plane) is conformally equivalent to $\\Delta$ (open unit disk), so what's the problem with se
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