Qual é o próximo número da sequência?[br][img]data:image/png;base64,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[/img]

Assinale a alternativa que contém uma expressão algébrica que representa a sequência de números pentagonais (questão 1) [br][br][img]https://upload.wikimedia.org/wikipedia/commons/thumb/b/b5/Pentagonal_number.gif/272px-Pentagonal_number.gif[/img]

[img]data:image/png;base64,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[/img][br]Quantos quadradinhos teremos na 5ª figura?

[img]data:image/png;base64,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[/img][br]Quantos quadradinhos teremos na 2023ª figura?

Observe a sequência de bolinhas a seguir.[br][img width=340,height=77]https://lh5.googleusercontent.com/lXcuJvWMzMbtn3hvyMOvzGA98lcmj9ZKz7M7jh1guuDlXhHbIfLqzdO8U2LQasyJJ-eX-4EVlASDohhkP4ZU22mNko5JpR3ZndH6Eyf2akoKCZpk_kdT5H0c5igPMrdREWwmXbaMdnYAwZ4BtZywmw[/img][br]Quantos bolinhas terá o quinto termo da sequência?

Observe a sequência de bolinhas a seguir.[br][img width=340,height=77]https://lh5.googleusercontent.com/lXcuJvWMzMbtn3hvyMOvzGA98lcmj9ZKz7M7jh1guuDlXhHbIfLqzdO8U2LQasyJJ-eX-4EVlASDohhkP4ZU22mNko5JpR3ZndH6Eyf2akoKCZpk_kdT5H0c5igPMrdREWwmXbaMdnYAwZ4BtZywmw[/img][br]Duas expressões algébricas equivalentes que descrevem corretamente essa sequência são