Simplify the expression:

To simplify the expression \(-6w + 9 + -10w\), we first combine the like terms.

1. Combine the \(w\) terms: \[ -6w + (-10w) = -16w \]

2. Now, we rewrite the expression: \[ -16w + 9 \]

So, the simplified expression is: \[ -16w + 9 \]

Simplify the expression:
6z+9z+5z

To simplify the expression \(6z + 9z + 5z\), we combine the like terms (the terms with \(z\)):

1. Add the coefficients: \[ 6 + 9 + 5 = 20 \]

2. Therefore, the simplified expression is: \[ 20z \]

So, the final result is: \[ 20z \]

Simplify the expression:
8c–10c+5c+5c

To simplify the expression \(8c - 10c + 5c + 5c\), we will first combine all the like terms (the terms with \(c\)):

1. Combine the coefficients of \(c\): \[ 8 - 10 + 5 + 5 \]

   Performing the calculations step by step:

   • \(8 - 10 = -2\)
   • \(-2 + 5 = 3\)
   • \(3 + 5 = 8\)

2. Therefore, the simplified expression is: \[ 8c \]

So, the final result is: \[ 8c \]

Simplify the expression:
–4d+4+5d+10

To simplify the expression \(-4d + 4 + 5d + 10\), we will combine like terms:

1. Combine the \(d\) terms: \[ -4d + 5d = 1d \quad \text{or simply } d \]

2. Combine the constant terms: \[ 4 + 10 = 14 \]

3. Now combine the results: \[ d + 14 \]

So, the simplified expression is: \[ d + 14 \]

Simplify the expression:
4c+2+9

To simplify the expression \(4c + 2 + 9\), we will combine the constant terms:

1. Combine the constants: \[ 2 + 9 = 11 \]

2. Rewrite the expression: \[ 4c + 11 \]

So, the simplified expression is: \[ 4c + 11 \]

Simplify the expression:
9x–3x+5–4x

To simplify the expression \(9x - 3x + 5 - 4x\), we will first combine the like terms (the terms involving \(x\)):

1. Combine the \(x\) terms: \[ 9x - 3x - 4x \]

   Performing the calculations step-by-step:

   • \(9x - 3x = 6x\)
   • \(6x - 4x = 2x\)

2. Now, the expression becomes: \[ 2x + 5 \]

Thus, the simplified expression is: \[ 2x + 5 \]