Răspuns :

Kitty200704id

[tex]a = {4}^{20} \times 3 + {2}^{40} \times 5 + {2}^{40} \\ = {( {2}^{2} )}^{20} \times 3+ {2}^{40} \times 5 + {2}^{40} \\ = {2}^{40} \times 3+ {2}^{40} \times 5 + {2}^{40} \\ = {2}^{40} (3 + 5 + 1) \\ = {2}^{40} \times 9 \\ = {( {2}^{20}) }^{2} \times {3}^{2} = {( {2}^{20} \times 3)}^{2} [/tex]

PutereDinuid

[tex]4^{20}\cdot 3+2^{40}\cdot 5+2^{40}=(2^2)^{20}\cdot 3+2^{40}\cdot5+2^{40} =\\=2^{40}\cdot (3+5+1)=2^{40} \cdot 9=(2^{20}\cdot 3)^2 \\ \boxed{\bold{(2^{20}\cdot 3)^2 \to \ p\u{a}trat \ perfect}}[/tex]

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