[color=#0000ff][b]PERÍMETRO[/b][/color] é a soma da medida dos lados de uma figura plana.[br]Exemplo 1:[br]Imagina você sendo uma formiga e contornando as figuras. a distância que você percorrer corresponderá ao perímetro da figura.[br][img]http://alunosonline.uol.com.br/upload/conteudo/images/perimetro-do-trapezio.jpg[/img][br][img]data:image/png;base64,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[/img][br]O perímetro da figura é 5 + 4 + 2 + 4 = 15 cm[br][br]Exemplo 2:[br]Agora imagine você como um artista que pintou um belo quadro e quer colocar uma moldura bem bonita em seu quadro. Você sabe que o preço do metro da moldura é R$ 37,50. Quanto você pagará para emoldurar o quadro?[br][img]data:image/jpeg;base64,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[/img]45 cm x 29,5 cm[br] [br]As medidas indicam que o quadro tem 45 cm de comprimento por 29,5 cm de largura.[br]Sendo assim, seu perímetro é 45 + 29,5+ 45 +29,5 = 149 cm[br][br]O preço do metro da moldura é de R$ 37,50. [br]149 cm = 1,49 m[br]1,49 x 37,50 = 56,02 [br][br]Sendo assim, você pagará R$ 56,02 pelo seu belo quadro emoldurado.

[color=#0000ff][b]ÁREA[/b] [/color]de figuras planas é a quantidade de espaço bidimensional de cada figura. [br]Como o nome já diz, bidimensional corresponde a duas dimensões: base (B) e altura (H).[br][br]Agora vamos brincar de contar quadradinhos.[br]Faça de conta que você é um colocador de pisos, o profissional mais solicitado da sua cidade. Então utilize a ferramenta abaixo para calcular quantos pisos cabem em cada figura. A quantidade de pisos corresponde à área da figura. [br]Modifique [color=#980000][b]B[/b][/color] para Base e[color=#980000][b] H[/b][/color] para altura e altere o tamanho da superfície. Depois mova [color=#980000][b]n [/b][/color]para contar a quantidade de pisos.

Você lembrou que, para calcular a área de uma figura retangular, basta multiplicar o comprimento pela largura?[br]Se não lembrou, você não é o melhor colocador de pisos da sua cidade. Não tem problema!! Você é uma aluno aprendendo Matemática.[br]Então vamos relembrar...[br]Mova os pontos e verifique a mudança nos valores das dimensões e da área da figura:[br]

Agora, estudante de Matemática, vou te contar que com a área do quadrado é mais fácil ainda. Basta elevar a medida do lado ao quadrado, ou seja, multiplicar a medida do lado por ela mesma. [br]Verifique essa ideia movimentando os pontos do quadrado abaixo: