Question

So sánh A và B , với:

A= (2003^2002 + 2002^2002)^2003

B= (2003^2003 + 2002^2003) ^2002

Answer 1

Answer 2

Bạn tham khảo thử nhé:

Ta có: \(A=\left(2003^{2002}+2002^{2002}\right)^{2003}\\ =2003^{2002.2003}+2002^{2002.2003}->\left(a\right)\\ B=\left(2003^{2003}+2002^{2003}\right)^{2002}\\ =2003^{2003.2002}.2002^{2003.2002}->\left(b\right)\\ Từ\left(a\right),\left(b\right),ta-thấy:2003^{2002.2003}+2002^{2002.2003}=2003^{2003.2002}+2002^{2003.2002}\\ =>A=B\)

Answer 3

\(A=\left(2003^{2002}+2002^{2002}\right)^{2003}\\ =2003^{2002.2003}+2002^{2002.2003}->\left(a\right)\\ B=\left(2003^{2003}+2002^{2003}\right)^{2002}\\ =2003^{2003.2002}.2002^{2003.2002}->\left(b\right)\\ Từ\left(a\right),\left(b\right),ta-thấy:2003^{2002.2003}+2002^{2002.2003}=2003^{2003.2002}+2002^{2003.2002}\\ =>A=B\)