Tìm hàm $f:\mathbb{R}\rightarrow \mathbb{R}$ thỏa mãn:
$f(xf(x+y))=f(yf(x))+x^2$
Tìm hàm $f:\mathbb{R}\rightarrow \mathbb{R}$ thỏa mãn:
$f(xf(x+y))=f(yf(x))+x^2$
s2_PADY_s2
Hope is a good thing, maybe the best thing, and no good thing ever dies
Tìm hàm $f:\mathbb{R}\rightarrow \mathbb{R}$ thỏa mãn:
$f(xf(x+y))=f(yf(x))+x^2$
Bạn tham khảo ở đây nhé.
$$[\Psi_f(\mathbb{1}_{X_{\eta}}) ] = \sum_{\varnothing \neq J} (-1)^{\left|J \right|-1} [\mathrm{M}_{X_{\sigma},c}^{\vee}(\widetilde{D}_J^{\circ} \times_k \mathbf{G}_{m,k}^{\left|J \right|-1})] \in K_0(\mathbf{SH}_{\mathfrak{M},ct}(X_{\sigma})).$$
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