Evaluate the expression for g = –14, h = –10, and j = 5.

g + h − j =

11 answers

To evaluate the expression \( g + h - j \) for \( g = -14 \), \( h = -10 \), and \( j = 5 \), we can substitute the values into the expression.

\[ g + h - j = -14 + (-10) - 5 \]

Now, we perform the calculations step by step:

  1. Add \( g \) and \( h \): \[ -14 + (-10) = -14 - 10 = -24 \]

  2. Next, subtract \( j \): \[ -24 - 5 = -29 \]

Therefore, the final result is: \[ g + h - j = -29 \]

Evaluate the expression for c = –4, d = –2, and f = –3.

cdf =

To evaluate the expression \( c \cdot d \cdot f \) with the given values \( c = -4 \), \( d = -2 \), and \( f = -3 \), we can substitute the values into the expression:

\[ cdf = (-4) \cdot (-2) \cdot (-3) \]

Now, let's perform the calculations step by step.

  1. First, multiply \( c \) and \( d \): \[ (-4) \cdot (-2) = 8 \]

  2. Next, multiply the result by \( f \): \[ 8 \cdot (-3) = -24 \]

Therefore, the final result is: \[ cdf = -24 \]

Evaluate the expression for x = 0 and y = 5.

–2y 2 to sec power − x =

To evaluate the expression \(-2y^2 - x\) for \(x = 0\) and \(y = 5\), we can substitute the values into the expression.

First, calculate \(y^2\):

\[ y^2 = 5^2 = 25 \]

Now, substitute \(y^2\) and \(x\) into the expression:

\[ -2y^2 - x = -2(25) - 0 \]

Now simplify:

\[ -2(25) = -50 \]

Thus:

\[ -50 - 0 = -50 \]

Therefore, the final result is:

\[ -2y^2 - x = -50 \]

Evaluate the expression for w = –10 and x = –3.

wx + x =

To evaluate the expression \( wx + x \) with \( w = -10 \) and \( x = -3 \), we first substitute the values into the expression:

\[ wx + x = (-10)(-3) + (-3) \]

Now, calculate it step by step:

  1. First, calculate \( wx \): \[ (-10)(-3) = 30 \]

  2. Next, add \( x \): \[ 30 + (-3) = 30 - 3 = 27 \]

Thus, the final result is:

\[ wx + x = 27 \]

Evaluate the expression for w = 6, x = –2, and y = 3.

wxy =

To evaluate the expression \( wxy \) with \( w = 6 \), \( x = -2 \), and \( y = 3 \), we can substitute the values into the expression:

\[ wxy = 6 \cdot (-2) \cdot 3 \]

Now, let's perform the calculations step by step:

  1. First, multiply \( w \) and \( x \): \[ 6 \cdot (-2) = -12 \]

  2. Next, multiply the result by \( y \): \[ -12 \cdot 3 = -36 \]

Therefore, the final result is: \[ wxy = -36 \]

Evaluate the expression for c = –4 and d = 8.

cd + d =

To evaluate the expression \( cd + d \) with \( c = -4 \) and \( d = 8 \), we can substitute the values into the expression:

\[ cd + d = (-4)(8) + 8 \]

Now, let's calculate it step by step:

  1. First, calculate \( cd \): \[ (-4)(8) = -32 \]

  2. Next, add \( d \): \[ -32 + 8 = -24 \]

Therefore, the final result is: \[ cd + d = -24 \]

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