Răspuns: n = 7
Explicație pas cu pas:
Salutare!
[tex]\bf n=[3^{3}+(3^{9}\cdot4-3^{9}):9^{4}-3^{0}]:[(5\cdot5^{2}\cdot5^{3})^{4}:5^{23}][/tex]
[tex]\bf n=[3^{3}+3^{9}\cdot(4-3^{0}):(3^{2})^{4}-3^{0}]:[(5^{1+2+3})^{4}:5^{23}][/tex]
[tex]\bf n=[3^{3}+3^{9}\cdot(4-1):3^{2\cdot4}-1]:[(5^{6})^{4}:5^{23}][/tex]
[tex]\bf n=(3^{3}+3^{9}\cdot 3:3^{8}-1):(5^{6\cdot 4}:5^{23})[/tex]
[tex]\bf n=(3^{3}+3^{9+1}:3^{8}-1):(5^{24}:5^{23})[/tex]
[tex]\bf n=(3^{3}+3^{10}:3^{8}-1):(5^{24-23})[/tex]
[tex]\bf n=(3^{3}+3^{10-8}-1):5^{1}[/tex]
[tex]\bf n=(3^{3}+3^{2}-1):5[/tex]
[tex]\bf n=(27+9-1):5[/tex]
[tex]\bf n=35:5[/tex]
[tex]\boxed{\bf n=7}[/tex]
Formule pentru puteri
a⁰ = 1 sau 1 = a⁰
(aⁿ)ᵇ = aⁿ ˣ ᵇ sau aⁿ ˣ ᵇ = (aⁿ) ᵇ
aⁿ · aᵇ = (a · a) ⁿ ⁺ ᵇ sau (a · a) ⁿ ⁺ ᵇ = aⁿ · aᵇ
aⁿ : aᵇ = (a : a) ⁿ ⁻ ᵇ sau (a : a) ⁿ ⁻ ᵇ = aⁿ : aᵇ
aⁿ · bⁿ = (a · b)ⁿ sau (a · b)ⁿ = aⁿ · bⁿ
aⁿ : bⁿ = (a : b)ⁿ sau (a : b)ⁿ = aⁿ : bⁿ
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