Right Triangle Geometry
A famous and easy geometry problem:
Let triangle $\triangle{ABC}$ have a right angle at $C$, and let $M$ be the midpoint of the hypotenuse $AB$. Choose a point $D$ on line $BC$ so that angle $\angle{CDM}$ measures $30$ degrees. Prove that the segments $AC$ and $MD$ have equal lengths.
[Sorry if it was posted in the forum already]
Let triangle $\triangle{ABC}$ have a right angle at $C$, and let $M$ be the midpoint of the hypotenuse $AB$. Choose a point $D$ on line $BC$ so that angle $\angle{CDM}$ measures $30$ degrees. Prove that the segments $AC$ and $MD$ have equal lengths.
[Sorry if it was posted in the forum already]
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- Posts:1007
- Joined:Sat Dec 09, 2017 1:32 pm
Re: Right Triangle Geometry
Can I use this type of diagram to solve the problem?
Re: Right Triangle Geometry
Perfect rational diagram it is
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- Posts:1007
- Joined:Sat Dec 09, 2017 1:32 pm
Re: Right Triangle Geometry
Solution.
At first draw $ME\perp BC$.Then we get the following diagram:
Now,$ME\parallel AC$,
So,$\dfrac {BM}{BA}=\dfrac {BE}{BC}=\dfrac {ME}{AC}=\dfrac 12$
$\Rightarrow AC=2ME$... ... ... ($1$)
And,in the right triangle $\triangle DEM$
$\dfrac {ME}{MD}=sin 30^\circ=\dfrac 12$
$\Rightarrow MD=2ME$... ... ...($2$)
From ($1$) & ($2$), $AC=MD$ [Q.E.D]
At first draw $ME\perp BC$.Then we get the following diagram:
Now,$ME\parallel AC$,
So,$\dfrac {BM}{BA}=\dfrac {BE}{BC}=\dfrac {ME}{AC}=\dfrac 12$
$\Rightarrow AC=2ME$... ... ... ($1$)
And,in the right triangle $\triangle DEM$
$\dfrac {ME}{MD}=sin 30^\circ=\dfrac 12$
$\Rightarrow MD=2ME$... ... ...($2$)
From ($1$) & ($2$), $AC=MD$ [Q.E.D]
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- Posts:57
- Joined:Sun Dec 11, 2016 2:01 pm
Re: Right Triangle Geometry
Let $F$ be such a point so that $ACDF$ is a rectangle.So,angle $MDF$=$60$°.Since $M$ is the circumcenter of $\bigtriangleup ABC$,$MC=MA$.Now,using perpendicularity lemma $MC^2+MF^2$=$MA^2+MD^2$ implying $MD=MF$.Since,angle $MDF$=$60$°,$\bigtriangleup MDF$ is equilateral.
Re: Right Triangle Geometry
So many solutions
Applying Sine law in $\triangle CDM$, we get:
$\frac {CM}{sin \angle CDM}=\frac{DM}{sin \angle DCM} \Rightarrow \frac{CM}{\frac {1}{2}}=\frac{DM}{sin \angle DCM} \Rightarrow 2CM=\frac{DM}{sin \angle DCM} \Rightarrow DM=2CM \times sin\angle DCM$ ...(1)
$M$ is the midpoint of the hypotenuse $AB$. So, $M$ is the center of the circumcircle of $\triangle ABC$.
$AM=BM=CM=\frac{1}{2}AB \Rightarrow 2CM=AB$
In $\triangle BCM$, $BM=CM$. So $\triangle BCM$ is isosceles.
In $\triangle BCM$, $\angle MBC=\angle MCB= \angle MCD$
Putting the values properly, we get:
$DM=2CM \times sin\angle DCM \Rightarrow DM=AB \times sin \angle MBC \Rightarrow DM=AB \times {\frac {AC}{AB}} \Rightarrow AC$ [According to $\triangle BCM$]
Applying Sine law in $\triangle CDM$, we get:
$\frac {CM}{sin \angle CDM}=\frac{DM}{sin \angle DCM} \Rightarrow \frac{CM}{\frac {1}{2}}=\frac{DM}{sin \angle DCM} \Rightarrow 2CM=\frac{DM}{sin \angle DCM} \Rightarrow DM=2CM \times sin\angle DCM$ ...(1)
$M$ is the midpoint of the hypotenuse $AB$. So, $M$ is the center of the circumcircle of $\triangle ABC$.
$AM=BM=CM=\frac{1}{2}AB \Rightarrow 2CM=AB$
In $\triangle BCM$, $BM=CM$. So $\triangle BCM$ is isosceles.
In $\triangle BCM$, $\angle MBC=\angle MCB= \angle MCD$
Putting the values properly, we get:
$DM=2CM \times sin\angle DCM \Rightarrow DM=AB \times sin \angle MBC \Rightarrow DM=AB \times {\frac {AC}{AB}} \Rightarrow AC$ [According to $\triangle BCM$]
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- Posts:1007
- Joined:Sat Dec 09, 2017 1:32 pm
Re: Right Triangle Geometry
I am thinking to solve it by using co-ordinate.But I am not getting any that type solution.Can anyone help me?
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- Posts:1007
- Joined:Sat Dec 09, 2017 1:32 pm