MHB Finding the Length of the Right Angle Bisector

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The discussion focuses on calculating the length of the angle bisector in a right triangle with legs a and b. The initial approach involves applying the Pythagorean theorem and the Law of Cosines to derive relationships between the segments created by the bisector. The use of the Law of Sines is also explored to establish a connection between the segments and angles. An alternative method using coordinate geometry is proposed, leading to the conclusion that the length of the bisector is x = (√2 * ab) / (a + b). This result aligns with the earlier findings in the thread, confirming the accuracy of the calculations.
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Hello

I would need help to continue.

calculation problem:
Given a right angled triangle with catheter lengths a and b length units, determine and indicate the length of the bisectris to the right angle.View attachment 6595

find: Xa^2 + b^2 = (y+z)^2X^2 + y^2 = a ^2X^2 + z^2 = b ^2
 

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I agree that we can apply the Pythagorean theorem to the right triangle:

$$a^2+b^2=(y+z)^2$$

However, for the two smaller triangles, they aren't necessarily right triangles, so we could apply the Law of Cosines instead:

$$z^2=x^2+b^2-\sqrt{2}bx$$

$$y^2=x^2+a^2-\sqrt{2}ax$$

Adding these last two equations together, we find:

$$y^2+z^2=2x^2+a^2+b^2-\sqrt{2}(a+b)x$$

Application of the Law of Sines yields (where $\theta$ is the angle subtended by $b$ and $z$):

$$\frac{x}{\sin(\theta)}=\sqrt{2}z$$

$$\frac{x}{\cos(\theta)}=\sqrt{2}y$$

Multiplying them together and rewriting the trig. functions as ratios, there results:

$$2yz=\frac{x^2(a^2+b^2)}{ab}$$

Adding this to the previous sum, we get:

$$y^2+2yz+z^2=2x^2+\frac{x^2(a^2+b^2)}{ab}+a^2+b^2-\sqrt{2}(a+b)x$$

Can you proceed?
 
Many thanks for your help; :)
 
Another approach would be to use coordinate geometry...we orient the right triangle in the first quadrant with the right angle at the origin, and to the hypotenuse lies along the line:

$$\frac{x}{a}+\frac{y}{b}=1$$

And the line segment labeled "x" lies along the line:

$$y=x$$

Substituting for $y$ into the first equation, we find:

$$\frac{x}{a}+\frac{x}{b}=1$$

Hence:

$$y=x=\frac{ab}{a+b}$$

Since the diagonal of a square with sides $s$ is $\sqrt{2}s$, we conclude the length of the segment labeled "x" is:

$$x=\frac{\sqrt{2}ab}{a+b}$$

And this agrees with the eventual outcome of my first post in this thread. :D
 
wonderful :o
 
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