Triangle Solution 4
A very useful feature available to you is to find the weight of your order by entering the number of items and their length.
Also, you can easily find the surface of the cross section, the center of gravity, the moments of inertia, the moments of resistance and many other properties of the cross section used in structural calculations and material strength.
Data
Density of Alloy (kgr/m3): | |
Aluminium Steel Other |
Side a: | |
Side b: | |
Angle a: |
Profile Length (mm): | |
Number of Pieces (pcs): |
Results
Weight (gr/m): | |
Side a: | |
Side b: | |
Side c: | |
Angle a: | |
Angle b: | |
Angle b: | |
Height of side a: | |
Height of side b: | |
Height of side c: | |
Interstitial side a: | |
Interstitial side b: |
Interstitial side c: | |
Angle ö: | |
Triangle Area: | |
Perimeter (mm): | |
È Helper:: | |
Radius of inscribed circle: | |
Áêôßíá Radius of inscribed circle: êýêëïõ: | |
Moment of Inertia Jx ê.â. (cm4): | |
Moment of Inertia Jy ê.â. (cm4): | |
Moment of Inertia Jxy (cm4): | |
Radius Inertia ix (cm3): |
Weight (kg): | |
Radius Inertia iy (cm3): | |
Radius Inertia ixy (cm3): | |
X centroid (mm): | |
Õ centroid (mm): | |
Moment of Inertia Jx (cm4): | |
Moment of Inertia Jy (cm4): | |
Moment of Inertia Jxy (cm4): | |
Principal moments of inertia K.B: | |
J11 (cm4): | |
J22 (cm4): | |
È(deg) rotation angle from largest moment of inertia: |