In the figure,$AD$ is a median of a triangle $ABC$ and $AM \perp BC$. Prove that $AC^2 + AB^2 = 2AD^2 + \frac{1}{2} BC^2$.
(N/A) Applying Pythagoras theorem in $\Delta ABM$,we obtain:
$AM^2 + MB^2 = AB^2 \quad \dots(1)$
Applying Pythagoras theorem in $\Delta AMC$,we obtain:
$AM^2 + MC^2 = AC^2 \quad \dots(2)$
Adding equations $(1)$ and $(2)$,we obtain:
$2AM^2 + MB^2 + MC^2 = AB^2 + AC^2$
Since $AD$ is a median,$BD = DC = \frac{BC}{2}$.
We can write $MB = BD - DM$ and $MC = DC + DM = BD + DM$.
Substituting these in the equation:
$2AM^2 + (BD - DM)^2 + (BD + DM)^2 = AB^2 + AC^2$
$2AM^2 + (BD^2 + DM^2 - 2BD \cdot DM) + (BD^2 + DM^2 + 2BD \cdot DM) = AB^2 + AC^2$
$2AM^2 + 2BD^2 + 2DM^2 = AB^2 + AC^2$
$2(AM^2 + DM^2) + 2BD^2 = AB^2 + AC^2$
In $\Delta ADM$,by Pythagoras theorem,$AM^2 + DM^2 = AD^2$.
So,$2AD^2 + 2(\frac{BC}{2})^2 = AB^2 + AC^2$
$2AD^2 + 2(\frac{BC^2}{4}) = AB^2 + AC^2$
$2AD^2 + \frac{BC^2}{2} = AB^2 + AC^2$
$AM^2 + MB^2 = AB^2 \quad \dots(1)$
Applying Pythagoras theorem in $\Delta AMC$,we obtain:
$AM^2 + MC^2 = AC^2 \quad \dots(2)$
Adding equations $(1)$ and $(2)$,we obtain:
$2AM^2 + MB^2 + MC^2 = AB^2 + AC^2$
Since $AD$ is a median,$BD = DC = \frac{BC}{2}$.
We can write $MB = BD - DM$ and $MC = DC + DM = BD + DM$.
Substituting these in the equation:
$2AM^2 + (BD - DM)^2 + (BD + DM)^2 = AB^2 + AC^2$
$2AM^2 + (BD^2 + DM^2 - 2BD \cdot DM) + (BD^2 + DM^2 + 2BD \cdot DM) = AB^2 + AC^2$
$2AM^2 + 2BD^2 + 2DM^2 = AB^2 + AC^2$
$2(AM^2 + DM^2) + 2BD^2 = AB^2 + AC^2$
In $\Delta ADM$,by Pythagoras theorem,$AM^2 + DM^2 = AD^2$.
So,$2AD^2 + 2(\frac{BC}{2})^2 = AB^2 + AC^2$
$2AD^2 + 2(\frac{BC^2}{4}) = AB^2 + AC^2$
$2AD^2 + \frac{BC^2}{2} = AB^2 + AC^2$
Explore More
Similar Questions
Fill in the blanks using the correct word given in brackets:
$(i)$ All circles are $........$ (congruent,similar)
$(ii)$ All squares are $.........$ (similar,congruent)
$(iii)$ All $.........$ triangles are similar. (isosceles,equilateral)
$(iv)$ Two polygons of the same number of sides are similar,if $(a)$ their corresponding angles are $......$ and $(b)$ their corresponding sides are $......$ (equal,proportional)
$(i)$ All circles are $........$ (congruent,similar)
$(ii)$ All squares are $.........$ (similar,congruent)
$(iii)$ All $.........$ triangles are similar. (isosceles,equilateral)
$(iv)$ Two polygons of the same number of sides are similar,if $(a)$ their corresponding angles are $......$ and $(b)$ their corresponding sides are $......$ (equal,proportional)
Medium
View SolutionSides of triangles are given below. Determine which of them are right triangles. In case of a right triangle,write the length of its hypotenuse.
$50 \text{ cm}, 80 \text{ cm}, 100 \text{ cm}$
$50 \text{ cm}, 80 \text{ cm}, 100 \text{ cm}$
Medium
View SolutionIf $AD$ and $PM$ are medians of triangles $ABC$ and $PQR,$ respectively,where $\Delta ABC \sim \Delta PQR,$ prove that $\frac{AB}{PQ} = \frac{AD}{PM}.$
Medium
View SolutionIn the figure,$DE \parallel AC$ and $DF \parallel AE$. Prove that $\frac{BF}{FE} = \frac{BE}{EC}$.
Easy
View SolutionIn the figure,if $PQ || RS,$ prove that $\Delta POQ \sim \Delta SOR$.
Medium
View SolutionVedclass Products
For Students
Vedclass Test Series
Mock tests in real JEE/NEET style with performance analysis. 5-day free trial.
Start Free TrialFor Teachers
Exam Paper Generator
Generate Set A/B/C/D exam papers from 7.5L+ questions in 2 minutes. 3 chapters free.
Try FreeFor Institutes
Online Exam Module
Live online exams with unlimited students, 360° analytics & white-label branding.
See Demo