Observa a figura seguinte, onde se encontram várias representações de vetores:[br][img]data:image/png;base64,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[/img][br]a) Identifica os vetores que têm a mesma direção do vetor [math]\vec{g}[/math].[br][br]b) Identifica os vetores que têm o mesmo comprimento do vetor [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAsAAAARCAYAAAAL4VbbAAAAAXNSR0IArs4c6QAAAM5JREFUOE+V0j9LwlEUxvHPbwvBRegFuDiEQ6ND0BQ4BDlFvgWbwjfg2mKSuzrXq4hcm4NAV0FoiSDa5MJVfvy4/jvwcJfvPfe5zzmZIyo7gnUIPMAMwyJ8jXucoJJTCdm+zmd4QQO/u+AegjaVgvt4wBsu8YrbcKMI3+EG7dguWJjiOQW/Y4RxhP9xjs8U/IMqvuM5z79etPGFWuz6hDqu1j9MeW5igRYmeNwG55P6wwU+UnAX5ZhtB0HBRjLn9RCWOE3EetAi7Zzg1q1dAbXQHhIg6p9uAAAAAElFTkSuQmCC[/img].

De acordo com a imagem: [br][img]data:image/png;base64,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[/img][br]Indica o valor lógico, V (verdadeiro) e F (falso) de cada uma das afirmações:[br][br]a) Os vetores [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA0AAAASCAYAAACAa1QyAAAAAXNSR0IArs4c6QAAAN5JREFUOE+t07FKgzEUhuGnl1AXcSoFJ+lFOHZ06WRF1Avo6qhTuzg62cGlFDoVcS3FCxAcnHVwdhJBNwnEEmMsv6UHQgic93znS05qVojaCowq0Bgj3H4L5NAuZvjER7K/o/UXlHe7g0kKhIQq7f2ynUOdWHlpwZLSCQ4Q/BWjBF3hCf3/QI84xhRbJd+5UjOqHOEaZ9hGN1XNof3opx2TAtRAKLKIHLrECwYx4wZhDZdBDwi3d49NPKOOU5yXJmIDr4nxPfRwhzdclKDwLodJ/+E8j4k/bKxljCp9ry+vFyITS5trfwAAAABJRU5ErkJggg==[/img] e [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAsAAAARCAYAAAAL4VbbAAAAAXNSR0IArs4c6QAAAM5JREFUOE+V0j9LwlEUxvHPbwvBRegFuDiEQ6ND0BQ4BDlFvgWbwjfg2mKSuzrXq4hcm4NAV0FoiSDa5MJVfvy4/jvwcJfvPfe5zzmZIyo7gnUIPMAMwyJ8jXucoJJTCdm+zmd4QQO/u+AegjaVgvt4wBsu8YrbcKMI3+EG7dguWJjiOQW/Y4RxhP9xjs8U/IMqvuM5z79etPGFWuz6hDqu1j9MeW5igRYmeNwG55P6wwU+UnAX5ZhtB0HBRjLn9RCWOE3EetAi7Zzg1q1dAbXQHhIg6p9uAAAAAElFTkSuQmCC[/img] são duas representações de um mesmo vetor.[br][br]b) Os vetores [math]\vec{n}[/math] e [math]\vec{e}[/math] têm um mesmo sentido.[br][br]c) Os vetores [math]\vec{f}[/math] e [math]\vec{j}[/math] têm a mesma direção.[br][br]d) Os vetores [math]\vec{d}[/math] e [math]\vec{m}[/math] são simétricos[br][br]