Área da base ([math]A_{b_{ }}[/math]):[br]Como a base de um prisma é um polígono, a área da base de um prisma é a área de um polígono.[br]Por exemplo, se a base do prisma for um quadrado cujo lado mede [math]l[/math], então [math]A_b=l^2[/math]; se a base do prisma for um triângulo, em que [math]b[/math] e [math]h[/math] são, respectivamente, as medidas da base e da altura relativa a essa base, então [math]A_b=\frac{b.h}{2}[/math].[br]Área lateral ([math]A_l[/math])[br]Como a superfície lateral de um prisma é a reunião de suas faces laterais, então a área lateral de um prisma é a soma das áreas das faces laterais.[br]Área total ([math]A_t[/math])[br]Como a superfície total de um prisma é a reunião da superfície lateral com as bases, então a área total de um prisma é dada por:[br]       [br]       [math]A_t=A_l+2.A_b[/math][br]

Calcule a área total da superfície de um prisma triangular reto, de altura 12 cm, sabendo que as arestas da base formam um triângulo retângulo de catetos que medem 6 cm e 8 cm. [br][br][br]

Em relação ao prisma hexagonal regular:[br][img]data:image/png;base64,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[/img][br]Calcule:[br]a) a área da base[br]b) a área lateral[br]c) a área total