In 4/3 the fractional part is
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Answer:
Look below
Step-by-step explanation:
the fractional part is
I hope it is correct...
Answer:
I hope it is correct...
Step-by-step explanation:
Let xx be a real number. Then the fractional part of xx is
\{x\}= x -\lfloor x \rfloor.
{x}=x−⌊x⌋.
This is the graph of the function \( y=\{x\}.\)
This is the graph of the function y=\{x\}.y={x}.
For nonnegative real numbers, the fractional part is just the "part of the number after the decimal," e.g.
\{3.64 \} = 3.64 - \lfloor 3.64 \rfloor = 3.64 - 3 = 0.64.
{3.64}=3.64−⌊3.64⌋=3.64−3=0.64.
But for negative real numbers, this is no longer the case:
\{-3.64 \} = -3.64 - \lfloor -3.64 \rfloor = -3.64 - (-4) = 0.36.
{−3.64}=−3.64−⌊−3.64⌋=−3.64−(−4)=0.36.
Note that in both cases \{ x \}{x} is nonnegative.
The following are some examples of how fractional part functions work:
\{ 1 \} = 1 - 1 = 0.{1}=1−1=0.
\left\{ \sqrt{2} \right\} = \sqrt{2}-1 = 0.4142\ldots.{
2
}=
2
−1=0.4142….
\{ \pi \} = \pi - 3 = 0.14159\ldots.{π}=π−3=0.14159….
\left\{ -\frac{17}5 \right\} = -\frac{17}5 - (-4) = \frac35.{−
5
17
}=−
5
17
−(−4)=
5
3