Some math problems go viral not because they’re difficult, but because they look easy and trick nearly everyone who tries them.
Today’s puzzle is exactly that kind of trap:

18 + 3 + 4! – 10

Nothing complicated here, right?
Just addition, a subtraction, and a factorial.
Except… when you post this online, you’ll still get a dozen different answers, each defended with total confidence.

Let’s explore the most common answers, why people think that way, and then the actual correct solution.

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💭 Possible Answer #1: “It’s 15!”

People who get 15 usually treat the equation like a simple left-to-right addition/subtraction problem:

18 + 3 = 21
21 + 4 = 25
25 – 10 = 15

What went wrong?
They treated 4! as just 4 instead of 4 × 3 × 2 × 1.

This happens because factorials aren’t something most people use daily — their brain quickly simplifies them.

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💭 Possible Answer #2: “It’s 35!”

This one comes from doing the factorial correctly, but then mis-grouping the rest:

4! = 24
18 + 3 = 21
21 + 24 = 45
45 – 10 = 35

The mistake:
They solved correctly but forgot order matters — addition and subtraction must still be done left to right.

Many people assume that once the “big number” from the factorial is found, everything else becomes flexible.

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💭 Possible Answer #3: “It’s 31!”

This group does most steps correctly, but accidentally combines operations differently:

18 + (3 + 24) – 10
18 + 27 = 45
45 – 14 = 31

The issue:
They add parentheses that don’t exist.
The equation feels long, so the brain naturally clusters it.

It’s a very human mistake — our minds love organizing things even when we shouldn’t.

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🧠 Why These Mistakes Happen

1. Factorials Aren’t Intuitive

People don’t use factorials often, so when they see “4!”, the brain hesitates —
“Do I do this first? Later? Does it override the left-to-right rule?”

2. People Forget Addition/Subtraction Rules

PEMDAS/BODMAS does not say addition comes before subtraction.
They are equal in priority, so you move left to right.

For many, this memory is fuzzy.

3. Mental Grouping Changes the Equation

Our brain tries to simplify expressions by “chunking” them, even when that changes the math.

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✅ Correct Answer

Let’s solve it properly:

Step 1 — Factorial first

4! = 24

Now the equation is:
18 + 3 + 24 – 10

Step 2 — Solve left to right

18 + 3 = 21
21 + 24 = 45
45 – 10 = 35

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🎉 Final Answer: 35

Even the cleanest-looking equations can cause chaos when factorials jump in.
This brain teaser is the perfect example of how easy it is to rely on instinct instead of proper order of operations.

Every once in a while, a simple-looking equation pops up and suddenly your entire comments section becomes a battlefield of confident answers.
Today’s brain-teaser is:

21 ÷ 7 × 2!

Looks easy, right?
That’s exactly why people get it wrong.

When factorials appear, many people switch into “fast math” mode and forget how order of operations actually works. So let’s walk through the three most common answers people usually give—plus what’s really going on.

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💭 Possible Answer #1: “It’s 6!”

This answer happens when someone solves it from left to right without noticing the factorial:

21 ÷ 7 = 3
3 × 2 = 6

The mistake?
They treated 2! as 2, not as the factorial of 2.

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💭 Possible Answer #2: “It’s 42!”

This usually happens when someone sees the factorial and panics (just a little). They jump to:

2! = 2
21 × 2 = 42
Then they divide or forget to divide at all.

This skips the left-to-right rule for division and multiplication.

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💭 Possible Answer #3: “It’s 3!”

Some do the factorial correctly, but they jump ahead in the steps:

2! = 2
21 ÷ (7 × 2) = 21 ÷ 14 = 1.5
Rounded or mistaken as 3, depending on how they group it.

The issue:
Adding parentheses that aren’t actually there.

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✅ The Correct Answer

Let’s solve it properly using PEMDAS/BODMAS:

Step 1 — Factorial first

2! = 2

Now the equation is:

21 ÷ 7 × 2

Step 2 — Division & multiplication (left to right)

21 ÷ 7 = 3
3 × 2 = 6

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🎉 Final Answer: 6

Another perfect example of how a simple factorial can completely change how people process an equation.

Every now and then, the internet stumbles upon a math problem that looks easy… but ends up dividing everyone into teams, sparking debates, and filling comment sections with confident answers that don’t match.
And this time, the troublemaker is:

15 ÷ 3 × 5 – 5!

At first glance, it feels like a basic school-level problem. But once people start calculating, the answers explode in every direction. Why? Because factorials + PEMDAS is a combo that tricks even confident math lovers.

Let’s take a look at the most common answers people give—why they give them—and finally, the correct solution.

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💭 The Most Common Answers People Think Are Right

1. “It’s 20!”

This is a super popular answer. People go straight from left to right:

15 ÷ 3 = 5
5 × 5 = 25
25 – 5 = 20

The problem?
They treated 5! as if it were just 5. But factorials don’t play by those rules.

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2. “It’s -95!” (Correct logic but wrong process)

Some people do remember that 5! = 120, but they mix up the order of the operations.
They might multiply 3 × 5 first—or reorder the steps—which leads to all sorts of incorrect results.

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3. The Overthinkers

Others start adding imaginary parentheses or doing steps in a custom order because the factorial symbol makes the expression look more complicated than it really is.

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✅ Now Let’s Solve It the Right Way

Step 1 — Factorials come first

5! = 120
So the equation becomes:
15 ÷ 3 × 5 – 120

Step 2 — Solve division and multiplication from left to right

15 ÷ 3 = 5
5 × 5 = 25

Now we have:
25 – 120

Step 3 — Subtract

25 – 120 = –95

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🎉 Final Answer: –95

This little equation is a perfect example of how people interpret math differently—especially when factorials sneak into the picture.
If you want an easy way to start a debate in your comments, this equation will definitely do the job.

Equation: 60 ÷ 3(3 + 1)

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Can You Solve This Faster Than Most People?

At first glance, this equation looks simple—just a division and some parentheses. But don’t be fooled. The way it’s written creates confusion about the order of operations and how to handle the implicit multiplication next to the parentheses.

This puzzle has gone viral many times because different people follow different mental shortcuts, and those shortcuts often lead to wrong answers. Let’s break it down carefully.

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Why This Problem Is Confusing

1. The parentheses (3 + 1) make people instinctively want to deal with them first—which is correct.
2. But after that, many forget that division and multiplication are equal in priority. They’re handled from left to right, not by choosing one first.
3. The “3(3+1)” looks like it might carry special weight because the multiplication is “implied,” but mathematically it doesn’t outrank division.

This is where most people slip.

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Common Wrong Answers (and Why People Get Them)

❌ Wrong Answer: 5

• How people get it: They first simplify the parentheses → (3 + 1) = 4.
  Then they treat 3 × 4 = 12 as a “unit” and divide: 60÷12=560 ÷ 12 = 560÷12=5.
• Why it’s wrong: Division and multiplication must be solved left to right. You can’t give the multiplication priority just because it touches parentheses.

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❌ Wrong Answer: 20

• How people get it: They stop halfway.
  60÷3=2060 ÷ 3 = 2060÷3=20 and then forget about the × (3 + 1).
• Why it’s wrong: The expression isn’t complete—multiplication with the 4 still needs to be done.

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❌ Wrong Answer: 24

• How people get it: After calculating 60÷3=2060 ÷ 3 = 2060÷3=20, some mistakenly add the parentheses result instead of multiplying:
  20+4=2420 + 4 = 2420+4=24.
• Why it’s wrong: This mixes operations incorrectly. The problem clearly states multiplication, not addition.

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❌ Wrong Answer: 5 (Fraction Misread)

• How people get it: Some rewrite it mentally as a single fraction:
  603(3+1)=6012=5\frac{60}{3(3+1)} = \frac{60}{12} = 53(3+1)60​=1260​=5.
• Why it’s wrong: If that’s what was intended, it should be written as:
  60÷[3(3+1)]60 ÷ [3(3+1)]60÷[3(3+1)]. As written, the expression is solved step by step, left to right.

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The Step-by-Step Correct Answer

Now let’s solve it properly using order of operations (PEMDAS/BODMAS):

1. Parentheses first:
   3+1=43 + 1 = 43+1=4 Expression becomes:
   60÷3×460 ÷ 3 × 460÷3×4
2. Division and multiplication are equal priority. Work left to right:
   • First: 60÷3=2060 ÷ 3 = 2060÷3=20
   • Then: 20×4=8020 × 4 = 8020×4=80

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✅ Correct Answer: 80

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Final Takeaway

This puzzle proves how much small details matter in math. The tricky part is not the arithmetic itself—it’s knowing that multiplication and division must be handled in order, from left to right, not based on how the equation “looks.”

That’s why so many people end up with 5, 20, or 24. But the only mathematically correct result is:

👉 80