It had been six months since I had lost my father, and while life went on, the sadness remained.
I found peace in visiting his tomb once a week and sharing with him things I could no longer say.
I stood by his grave with a bunch of white lilies, his favorite.
“Goodbye, Dad,” I muttered, wiping away a tear.
As I turned to go, I observed a thin figure standing a few rows away next to a recently dug grave. An elderly blind woman wearing a plain black outfit grasped a white cane.
“Excuse me, ma’am,” I said softly, approaching her. “Do you need help?”
She turned her head toward me, her lips curving into a slight smile. “Oh, thank you, dear. I’d appreciate it if you could walk me home. My sons were supposed to pick me up, but I think they’ve forgotten.”
“Of course,” I said. “I’d be happy to help.”
She introduced herself as Kira. Her husband, Samuel, had pa:ss:ed away just days before.
“They didn’t even wait with me at the cemetery,” she continued bitterly. “My sons, Ethan and Mark. They said they’d come back in half an hour, but I waited two hours. Samuel always said they’d be the death of me, but I didn’t want to believe him.”
We arrived at her modest home, a charming brick house encircled by a rose garden. “Would you like to come inside for tea?” she inquired.
The inside was warm and pleasant, with faded photos on the walls. One drew my attention: a younger Kira and a man I guessed was Samuel, their hands intertwined, standing in front of the Eiffel Tower.
“Samuel installed cameras all over the house,” Kira explained as she poured tea. “He did not trust the boys.
I had no idea how much that small act of kindness would change my life.
The next morning, I was startled awake by a banging on my door. My heart raced as I stumbled out of bed, still half sleepy.
I opened the door to discover two men looking at me, flanked by a police officer. One of the men, maybe 35, broad-shouldered and enraged, pointed at me. “That’s her! She was in our mother’s house yesterday!”
“I walked her home from the ce:m:etery yesterday.”
The younger of the two males, approximately 25, took a stride toward me, his face flushed with rage. “And then what? You decided to rob her blind?”
“Mom told us you were in her house. She said you stayed for tea. Who else would’ve taken the money and jewelry?”
“This has to be a mistake. I didn’t take anything!”
How had things gone so wrong?
Kira was already at the station, seated in a corner with her cane resting on her knee. Her face lit up when she spotted me.
“Thank goodness,” she said, reaching out for my hand. “I told them you didn’t do it.” “And because they’re greedy.”
“Samuel installed cameras in the house, remember? Officer, I told you to check the recordings.”
Ethan’s face became pallid. “Mom, you don’t have to do this.”
“Oh, I think I do,” Kira shot back. “I’m tired of covering for you boys.”
One hour later, the corps returned carrying a laptop. “See?” I said, relief washing over me. “I didn’t take anything!”
Moments after my leaving, Ethan and Mark arrived in the picture, digging through drawers and cabinets. They emptied jewelry cases and took cash from an envelope stashed in a cookie jar.
Ethan stammered, “We… we were looking for paperwork!”
The brothers were arrested on the scene and charged with larceny and making a fake report.
I was free to leave, but the encounter had left a bitter taste in my mouth. As I accompanied Kira home that evening, she opened up more about her family.
“Samuel adored them when they were younger,” she said. “But as they grew older, they changed. They became greedy, always asking for money, never giving back.”
In the weeks that followed the horrific incident, I found myself pulled to Kira’s house more frequently than I anticipated. Our original bond, formed in the most unlikely of circumstances, strengthened with each visit.
“Maybe Samuel sent you to me.” Kira said.
“Thank you,” she whispered. “For being my light in a dark moment.”
“Sometimes, strangers become family in ways you never expect.”
Can You Solve This Tricky Viral Math Problem
We all love a good brain teaser, especially when it involves math—whether we admit it or not. A tricky math problem recently went viral, leaving the internet divided and proving once again that even simple-looking equations can be deceptive.
My Math Struggles & A Challenge
Here’s a quick personal anecdote: I recently started preparing for the GRE and realized that I hadn’t taken a formal math class in nearly nine years. Confidence? Gone. My quantitative reasoning skills? Rusty at best. So, I decided to brush up by taking online high school math courses, starting from the absolute basics.
When I came across this viral math puzzle that was stumping the internet, I thought, “This is my moment! Let’s see if I still have my 9th-grade math chops!” Spoiler: I did not.
The Viral Math Puzzle Taking the Internet by Storm
The problem originally surfaced in Japan, where researchers found that only 60% of people in their 20s managed to solve it correctly. It quickly spread online, turning into yet another viral challenge because, apparently, we love testing our brains with tricky equations (or we just enjoy arguing over the answers).
At first glance, the problem looks simple. But the devil is in the details. My gut told me there was some sort of trick involved—it seemed too easy. However, instead of embarrassing myself by attempting it publicly, I turned to the internet for guidance. If there’s one thing I’ve learned, it’s that someone, somewhere, has already tackled your problem and made an instructional video about it. So, I spent my morning watching people do math on YouTube. Exciting stuff.
The Math Problem:
6 ÷ 2(1 + 2) = ?
Go ahead, solve it. I’ll wait.
Video : Viral problem from Japan
Common Wrong Answers
If you got 1 or 9, you’re not alone. Many people arrived at these answers because of a little acronym called PEMDAS (Parentheses, Exponents, Multiplication, Division, Addition, Subtraction).
You may remember PEMDAS from school—or perhaps the mnemonic “Please Excuse My Dear Aunt Sally.” The rule dictates that you must solve problems in this specific order:
- Parentheses
- Exponents
- Multiplication & Division (from left to right)
- Addition & Subtraction (from left to right)
So, following PEMDAS, some people calculated it as:
- Solve inside the parentheses: (1 + 2) = 3
- Rewrite the problem: 6 ÷ 2(3)
- Some then treated 2(3) as a single term and multiplied first: 6 ÷ 6 = 1
However, others applied division before multiplication:
- 6 ÷ 2 = 3
- Then, 3 × 3 = 9
Both groups were confident in their logic, but only one approach was correct.
The Correct Answer
The correct answer is 9. Here’s why:
Step 1: Solve the Parentheses First
(1 + 2) = 3
Now the equation is rewritten as:
6 ÷ 2(3)
Step 2: Follow the Order of Operations
According to PEMDAS, division and multiplication are performed from left to right (since they share the same level of priority in the hierarchy).
- 6 ÷ 2 = 3
- 3 × 3 = 9
Wait… Isn’t the Answer 1?
Some people argue that implicit multiplication (like 2(3)) takes precedence over division. However, modern mathematical notation treats multiplication and division equally. Since they appear side by side in the equation, we solve left to right.
If the equation had been written as:
6 ÷ (2 × 3)
Then, you would multiply first and get:
6 ÷ 6 = 1
But because the given equation lacks parentheses around 2(3), the correct answer remains 9.
Why People Get It Wrong
The confusion stems from different ways of interpreting notation and how we were taught order of operations. In some older textbooks, implicit multiplication (like 2(3)) was given higher priority than division, leading to the alternative answer of 1. However, under modern mathematical conventions, division and multiplication hold equal weight and should be solved left to right.
Video : 13 Riddles That Are Trickier Than They Seem
Math Rules Are Not Always Universal
Believe it or not, different countries and academic institutions teach math slightly differently. Some older math textbooks might suggest treating multiplication next to parentheses as having higher priority, while others follow the standard left-to-right rule. This is why debates like this never really die down—people were simply taught different methods!
How to Avoid Future Math Confusion
- Always follow the standard order of operations – PEMDAS (or BODMAS, if you learned it that way).
- If in doubt, add brackets – Parentheses make everything clearer and help prevent confusion.
- Be consistent – If you’re solving problems with others, use the same approach so that everyone gets the same answer.
- Check multiple sources – Sometimes, even textbooks disagree. Looking at different explanations can help clarify tricky concepts.
Final Thoughts
This viral math problem is a perfect example of how simple-looking equations can spark endless debate. The way you approach it depends on how you learned math, but if you apply PEMDAS correctly, the answer is 9—at least according to current conventions.
So, did you get it right, or are you questioning everything you thought you knew about math? Either way, at least we can all agree that math is a lot trickier than it looks!
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