There are 3 steps to solving equations involving ABSOLUTE VALUE:
1. Apply the rule that says: If |x| = k, then x = k and/or x = -k
2. Solve the resulting equations
3. Plug solutions into original equation to check for extraneous roots

Given: x² – 8x + 21 = |x – 4|+ 5
Subtract 5 from both sides: x² – 8x + 16 = |x – 4|
Apply above rule

We get two cases: x² – 8x + 16 = x – 4 and -(x² – 8x + 16) = x – 4

x² – 8x + 16 = x – 4
Add 4 to both sides: x² – 8x + 20 = x
Subtract x from both sides: x² – 9x + 20 = 0
Factor: (x - 5)(x - 4) = 0
So, x = 5 or x = 4

-(x² – 8x + 16) = x – 4
Simplify: -x² + 8x - 16 = x – 4
Add 4 to both sides: -x² + 8x - 12 = x
Subtract x from both sides: -x² + 7x - 12 = 0
Multiply both sides by -1 to get: x² - 7x + 12 = 0
Factor: (x - 3)(x - 4) = 0
So, x = 3 or x = 4

We have three potential solutions: x = 5, x = 4 and x = 3

Now let's test for EXTRANEOUS ROOTS

x = 5
Plug into original equation to get:
5² – 8(5) + 21 = |5 – 4|+ 5
Evaluate: 6 = 6
WORKS! So, x = 5 IS a valid solution

x = 4
Plug into original equation to get:
4² – 8(4) + 21 = |4 – 4|+ 5
Evaluate: 5 = 5
WORKS! So, x = 4 is a valid solution

x = 3
Plug into original equation to get:
3² – 8(3) + 21 = |3 – 4|+ 5
Evaluate: 6 = 6
WORKS! So, x = 3 is a valid solution

SUM of all solutions = 5 + 4 + 3 = 12

Answer: D