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Leo comprensivamente con mis compañeros:<h1><a href="https://www.gasset.edu.ec/la-importancia-de-la-geometria/">La importancia de la Geometría</a></h1>La geometría es muy importante ya que todo lo que nos rodea está lleno de figuras geométricas; en la vida diaria el conocimiento sobre las bases de la geometría es útil para orientarse en el espacio, identificar y asociar formas, distancias y líneas.Los seres humanos conocemos el entorno relacionando los objetos con figuras geométricas con significado concreto. Mesa, ventana, reloj, pelota, hoja, etc. En la casa, colegio, espacios donde se interactúa aprendemos a organizar mentalmente la ubicación y el espacio que le rodea.La geometría se hace presente en varios ámbitos, en especial en la producción agrícola, industrial, arquitectura, diseño, deportes, cartografía entre otras. Esta es indispensable en el arte y las nuevas creaciones que esta implica junto con el estudio de las formas de todos los elementos de la naturaleza.

Ejercicios

Transcribo en mi cuaderno, con buena caligrafía y ortografía:.¿Qué son figuras bidimensionales?Una figura es bidimensional si sólo tiene dos dimensiones (como ancho y alto) y no espesor. Las llamadas figuras planas. Ejemplo: Todos los polígonos: Triángulo, cuadrado, rectángulo, rombo, trapecio, trapezoide.<img 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" alt=""><img src="https://matematicasparaticharito.files.wordpress.com/2015/02/rombo.png?w=300&amp;h=232" alt="Perímetro y área del rombo | matematicas para ti"><img src="data:image/png;base64,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" alt="Características del Cuadrado -? Área y Perímetro de un Cuadrado ?" data:image="" png;base64,ivborw0kggoaaaansuheugaaaraaaac5camaaadxsjc1aaaa21bmvex="" tgyqaaadqhstqhsh="" f="" v3+="" vm5ub="" vpvb2+fv126urs2isiaaacbsevghyb09="" beisnae3rlrk3mhcqrkjwampwojyhqmzpfnt7jljhqhcfugcwuquxnkjx3="" 8kkcyaawg0u7mvnzwmaad="" +p729vopk5kklo6llzkqkzfkymorfhwfnqd1+="" qtcalwmdbajcyrght5vfanqksir0atte5yrewoxmo4wf="" hlji7nj2tsk+puvs8rk="" yiy67nkhbu1qfcxtmhyfnc3xkdhsehh5qamptwbouaaaddkleqvr4no3ddvfsubya8b1pvaqoysnlhu4x7cxkznteyvl7f6luvenlig+k8l="" p86a7oybn1x+xbsjn4dhererererefhzfkejgwzacvwlmoqogcki9kcxz4kpfriqcghgscypy4cagbskuscxsmligaiqkjlzpx6dfmummsmxjjlavlxper1gaeul5ktmreonjbpbb74nsqmxdbpasm8+tsbjx4igtgebhmlfe6tsbs03xoltbbzrb282dzfh9lhigwxvr2du7aylm4ay99trsbp4eqrutfnnulduvscxiyq63bksnw4lukaqqwbzkq3x3pqxtfuybqfmzisdnh8tzpn1e2hsl3d6x="" a8kzl1enkjjgitfdkkefdtcle7w6pi7p0fcczc8+v2km9rqnf39r="" xum9y+0fs3gqun+2agqgffijurpoixvxdoaq5="" l7ktnhrhtlh8daai4vhsrbzfqh1idef5bzlf5h4krnltzpm42ieequfn6lvdlalyit1d1fiw6vrvrkdqurgbkc32ysb+vduhiwvovaebbbbaaaeeeeaaaqqqqaabzmogan8raes="" ahhibhbmimsmuraegeiyqwabbbbaaaeeeeaaaqqqqaab5hgbslzrdhbaaaeeeeaekyiabycaaaiiiiaaaggggaaccccaaaiiiiaaaggggdxuen78dwgggaaccccaaaiiiiaaasjdaxeieeaaaqqqqaabhdf="" awiiiiaaml0qaq9aaaeeeeaaaqqqqaabbbbaaaeeeeaaaqqqqo4aesgowawsuppicgafpz1yvfa6kzurb7zhdkh53xach9s9djl8ppfapcfiaaoi7="" ubvpjfybqn7vjq+mrl1014o30glxuxtfxujtnvuvesxhhdnw507qjj0rsvdmojzb9iudl7+l4gya0bqfvnsvwlkjlrxali97rlscmugolycr5semgccxv+1ziq4fxw164z1dlctfxlmzmxdi+savglfb05fzhypbas1dn9i0c6jxkjqi0vm0b+rijxfz4hqijug="" z89uy8s7pfbwvijaxiqc0bec9="" ykw5axeir0ze6yhyuvsvfigjcvjhwofi0ia78="" pn6kt9s3detfix5fcpxzxl1uxnh2o2ljua8wthyx4ruqpdpdk1giiiiiiiiiiiinow="" qveaq+rcx+qbgaaaabjru5erkjggg="=&quot;" =""="" es-static.z-dn.net="" files="" d40="" a744aa662e68a0f5dfbb87d9253088c6.png"="" "=""><img src="https://sites.google.com/site/poligonossofamilipadululipili/_/rsrc/1472783672035/home/cuadrilateros/trapezoides-y-romboides/b.jpg" alt="Trapezoides y Romboides - Polígonos">¿Què son figuras tridimensionales?Las figuras tridimensionales su nombre lo dice son aquellas que tienen tres dimensiones: Largo, ancho y alto. Son también llamadas sólidos, que están limitados por caras planas o curvas. Como: <img src="https://i.ytimg.com/vi/r8Iu-aiT9dE/maxresdefault.jpg" alt="Cuerpos Geométricos Básicos - Figuras Geométricas 3D - Los Cuerpos Geométricos - YouTube" "="">

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