Write 4 x 10^12 in decimal notation

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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

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

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 +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

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) 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)

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

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)

spinning a 1, 2, or 3. option d.

step-by-step explanation: when spinning a number graph up to 4, and aiming for any number less than 3, that automatically eliminates the number 4. now you have two numbers to spin on that are less than 3, but the number 3 is included in this question because it's no greater of an number than itself. i hope this you : )

$9.41

step-by-step explanation: