Write an inverse variation equation, yequalsStartFraction k Over x EndFraction
, that satisfies the ordered pairs in the table.
x
negative 6
negative 5
negative 3
1
y
negative 0.5
negative 0.6
negative 1
3
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Part 1
yequals
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9 answers
y = -0.2x
incorrect
Since the given ordered pairs satisfy the inverse variation equation \(y = \frac{k}{x}\), we can find the value of \(k\) by substituting one of the ordered pairs into the equation.
Let's use the ordered pair (-6, -0.5):
-0.5 = \frac{k}{-6}
-0.5 = -\frac{k}{6}
k = 3
Therefore, the inverse variation equation that satisfies the given ordered pairs is \(y = \frac{3}{x}\)
Let's use the ordered pair (-6, -0.5):
-0.5 = \frac{k}{-6}
-0.5 = -\frac{k}{6}
k = 3
Therefore, the inverse variation equation that satisfies the given ordered pairs is \(y = \frac{3}{x}\)
what is the answer
The inverse variation equation that satisfies the given ordered pairs is:
\[ y = \frac{3}{x} \]
\[ y = \frac{3}{x} \]
WHAT IS THAT I DONT SPEAK AI BOT
The inverse variation equation that satisfies the ordered pairs in the table is:
\[ y = \frac{3}{x} \]
\[ y = \frac{3}{x} \]
WHAT IS FRAC
"frac" is the shortened term for "fraction". In the context of mathematics, a fraction is a numerical quantity that is not a whole number. It is usually represented as a numerator over a denominator, separated by a horizontal line.
For example, in the fraction \(\frac{3}{x}\), 3 is the numerator and \(x\) is the denominator.
For example, in the fraction \(\frac{3}{x}\), 3 is the numerator and \(x\) is the denominator.
11 answers