Kwai Logo
Kwai User Avatar
Um sólido geométrico é uma figura tridimensional, ou seja, que possui três dimensões: altura, largura e profundidade. Eles ocupam espaço e podem ser tocados ou visualizados em 3D. Existem vários tipos de sólidos geométricos, e eles são classificados de acordo com suas características, como faces, arestas e vértices. Aqui vão os principais: 1. Poliedros São sólidos formados apenas por faces planas : #enem #matematica
66
2
Unduh
Memut
kwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwaikwai kwaikwaikwaikwaikwaikwaikwaikwaikwaikwai