A 2-column table has 4 rows. The first column is labeled x with entries negative 4, negative 2, 3, 3. The second column is labeled y with entries negative 1, 4, negative 3, negative 4.

Which linear inequality could represent the given table of values?
y –One-halfx – 3
y ≤ –One-halfx – 3

The table has x and y values, to find which inequality satisfies the given data Substitution of values in the inequalities have to be done.

The first inequality is

y < -2x +3

-1 < - 2 *(-4) +3

-1 <8 +3

-1 <11

True

It is not true for ( 3,-3)

The second inequality

y≤ -2x+3

This is true for all the values of the data

Therefore, the linear inequality that represents the given table values is ≤ -2x+3.

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A 2-column table has 4 rows. The first column is labeled x with entries negative 4, negative 2, 3, 3. The second column is labeled y with entries negative 1, 4, negative 3, negative 4. Which linear inequality could represent the given table of values? y –One-halfx – 3 y ≤ –One-halfx – 3

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A 2-column table has 4 rows. The first column is labeled x with entries negative 4, negative 2, 3, 3. The second column is labeled y with entries negative 1, 4, negative 3, negative 4.

Which linear inequality could represent the given table of values?
y –One-halfx – 3
y ≤ –One-halfx – 3