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gsm8k-0002

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0/1 tests· math
Challenge · difficulty 2/5
# GSM8K Problem 3

Josh decides to try flipping a house.  He buys a house for $80,000 and then puts in $50,000 in repairs.  This increased the value of the house by 150%.  How much profit did he make?

Reason step by step, then give ONLY the final answer on the last line as \boxed{ANSWER}.

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Proposed solution
The user wants me to solve a word problem about calculating profit from flipping a house.

**1. Understand the goal:**
Calculate the profit Josh made.

**2. Identify the given information:**
*   **Purchase Price:** $80,000
*   **Repair Cost:** $50,000
*   **Value Increase:** 150%

**3. Analyze the "Value Increase" part:**
The problem states: "This increased the value of the house by 150%."
This phrasing is slightly ambiguous. Does it mean the value became 150% of the original value, or did it increase *by* 150% (meaning the new value is original + 150% of original)?
Usually, "increased by X%" means New Value = Old Value + (X% * Old Value).
So, New Value = Old Value * (1 + 1.5) = Old Value * 2.5.

Let's check the context.
Original Value (before repairs) = Purchase Price = $80,000.
Increase = 150% of $80,000.
Increase Amount = 1.5 * 80,000 = 120,000.
New Value (Selling Price) = Original Value + Increase Amount = 80,000 + 120,000 = 200,000.

Alternative interpretation: "This increased the value of the house to 150%."
If it meant "to", the new value would be 1.5 * 80,000 = 120,000.
However, the text says "increased the value... by 150%". The standard mathematical interpretation of "increased by" is addition.
Let's stick with the standard interpretation: New Value = $80,000 + (1.50 * $80,000) = $200,000.

**4. Calculate Total Cost:**
Total Cost = Purchase Price + Repair Cost
Total Cost = $80,000 + $50,000 = $130,000.

**5. Calculate Profit:**
Profit = Selling Price (New Value) - Total Cost
Selling Price = $200,000
Total Cost = $130,000
Profit = $200,000 - $130,000 = $70,000.

**Let's double check the interpretation of "increased the value by 150%".**
Sometimes in these generated problems, the wording can be tricky.
If the house was worth $80k.
Repairs cost $50k.
The repairs increased the value by 150%.
Does the value increase apply to the purchase price or the value *after* repairs?
Usually, "value of the house" refers to the market value.
Before repairs, value = $80,000 (assuming he bought it at fair market value).
After repairs, value increased by 150%.
Increase = 1.5 * 80,000 = 120,000.
New Value = 80,000 + 120,000 = 200,000.

Is it possible the problem implies the value increased *to* 150%?
If it increased *to* 150%, New Value = 1.5 * 80,000 = 120,000.
Profit = 120,000 - 130,000 = -10,000 (Loss).
Usually, these problems result in a positive profit.
Also, "increased by" is distinct from "increased to".
Let's assume the standard mathematical meaning: "increased by" means addition.

Let's re-read carefully: "This increased the value of the house by 150%."
"This" refers to the repairs.
So the repairs caused the value to go up by 150% of the original value.
Original Value = $80,000.
Increase = 1.5 * 80,000 = $120,000.
Final Value = $80,000 + $120,000 = $200,000.

Total Investment = $80,000 (buy) + $50,000 (repair) = $130,000.
Profit = Final Value - Total Investment = $200,000 - $130,000 = $70,000.

Let's consider if "value of the house" refers to the value *after* the purchase but *before* repairs? Yes, that's the standard assumption.
Is there any ambiguity about whether the 150% increase is based on the purchase price or the cost of repairs?
"This increased the value of the house by 150%."
The subject is "the value of the house". The base for percentage increase is usually the initial value of the house.
Initial value = $80,000.

Let's check if there is an alternative interpretation where the 150% refers to the *total* value becoming 150% of the purchase price.
If the text meant "increased the value to 150%", the profit would be negative.
If the text meant "increased the value by 150%", the profit is positive.
Given it's a "profit" problem, a positive result is expected.

Let's check if the base for the percentage is the cost of repairs?
"This (the repairs) increased the value of the house by 150%."
Usually, percentage increases are relative to the original state.
If the repairs cost $50,000, and they increased the value by 150% of