
We are given:
(999)2−(998)2(999)^2 – (998)^2
This is a classic difference of squares identity:
a2−b2=(a−b)(a+b)a^2 – b^2 = (a – b)(a + b)
Let’s apply it:
a = 999
b = 998
So:
(999)2−(998)2=(999−998)(999+998)=1×1997=1997(999)^2 – (998)^2 = (999 – 998)(999 + 998) = 1 × 1997 = 1997
✅ Final Answer:
1997
I have completed my [Your Degree, e.g., B.Com, B.Tech, MBA] from [Your College/University Name]. During my studies, I focused on [mention key subjects or areas], and I also gained practical exposure through [internships, projects, or workshops if any].
🟩 My Expectation from the Job:
I am looking for a role where I can apply my knowledge, learn from experienced professionals, and grow both personally and professionally. I expect a positive work environment, learning opportunities, and a platform to contribute meaningfully to the organization’s goals.
Would you like this customized with your exact qualification and industry?
We are given:
Profit sharing ratio of X : Y = 2 : 3
X invested ₹40,000
We are to find how much Y invested
🟢 Step 1: Use the concept of profit-sharing ratio = investment × time (assuming same time period)
So, if X’s share is 2 parts and he invested ₹40,000, then:
Let Y’s investment be ₹x
Now set up the ratio:
X′s investmentY′s investment=23\frac{X’s\ investment}{Y’s\ investment} = \frac{2}{3} 40000x=23\frac{40000}{x} = \frac{2}{3}
🟢 Step 2: Cross-multiply:
2x=3×40000=120000⇒x=1200002=600002x = 3 × 40000 = 120000 \Rightarrow x = \frac{120000}{2} = 60000
✅ Final Answer:
The amount invested by Y is ₹60,000.