send mail to support@abhimanu.com mentioning your email id and mobileno registered with us! if details not recieved
Resend Opt after 60 Sec.
By Loging in you agree to Terms of Services and Privacy Policy
Claim your free MCQ
Please specify
Sorry for the inconvenience but we’re performing some maintenance at the moment. Website can be slow during this phase..
Please verify your mobile number
Login not allowed, Please logout from existing browser
Please update your name
Subscribe to Notifications
Stay updated with the latest Current affairs and other important updates regarding video Lectures, Test Schedules, live sessions etc..
Your Free user account at abhipedia has been created.
Remember, success is a journey, not a destination. Stay motivated and keep moving forward!
Refer & Earn
Enquire Now
My Abhipedia Earning
Kindly Login to view your earning
Support
Type your modal answer and submitt for approval
If AD, BE, CF arc the medians of a ΔABC then the correct relation between the sum of the squares of sides to the sum of the squares of median is
2(AB2 + BC2 + AC2) = 3(AD2 + BE2 + CF2)
4(AB2 + BC2 + AC2) = 3(AD2 + BE2 + CF2)
3(AB2 + BC2 + AC2) = 4(AD2 + BE2 + CF2)
None of the above
Let G be the centroid of ΔABC. In ΔABC, [? The sum of the squares of any two sides is equal to twice the square of the half of the third side together with the square of the median bisecting the third side] ∴ AB2 + AC2 = 2AD2 + 2(1/2BC2) ......i ⇒ AB2 + BC2 = 2AD2 + 1/2BC2 BC2 + AB2 = 2BE2 + 1/2AC2 ..........ii BC2 + AC2 = 2CF2 + 1/2AB2 ..........iii Adding (i), (ii) and (iii), we get 2(AB2 + BC2 + AC2 = 2(AD2 + BE2 + CF2) + 1/2(AB2 + BC2 + AC2) ∴ 3(AB2 + BC2 + AC2) = 4(AD2 + BE2 + CF2)
By: Amit Kumar ProfileResourcesReport error
Access to prime resources
New Courses