chloeconlon2014
15.07.2020 •
Mathematics
I don't know what to do.
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Answers on questions: Mathematics
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Ответ:
True.
Step-by-step explanation:
Pythagorean Theorem: a² + b² = c²
We can simply plug in the 3 variables to see if it forms a Pythagorean Triple:
6² + 13² = 14.32²
36 + 169 = 205.062
205 = 205 (rounded), so True.
Ответ:
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Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)on
Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)
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Review the graph of f(x) = RootIndex 5 StartRoot x EndRoon
Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)on
Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)on
Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)on
Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)on on
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Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)on
Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)on
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Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)on
Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)
Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)on
Review the graph of f(x) = RootIndex 5 StartRoot x EndRoot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)ot and the graph of the transformed function g(x). If g(x) = a · f(x + b), how is f(x) transformed to get g(x)? A. –2f(x + 4) B. –2f(x – 4) C .–f(x + 4) D. –f(x – 4)on
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