1T 2012 vår LØSNING: Forskjell mellom sideversjoner
Fra Matematikk.net
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b)<p></p> | b)<p></p> | ||
<tex>5,5 \cdot 10^5 \cdot 6,0 \cdot 10^6 = 5,5 \cdot 6,0 \cdot 10^{11} =33,0 \cdot 10^{11} = 3,3 \cdot 10^{12} </tex> | <tex>5,5 \cdot 10^5 \cdot 6,0 \cdot 10^6 = 5,5 \cdot 6,0 \cdot 10^{11} =33,0 \cdot 10^{11} = 3,3 \cdot 10^{12} </tex><p></p> | ||
c)<p></p> | |||
<tex>\left[{ x+2y =16 \\ 3x-y=6 }\right] \\ \left[{ x =16-2y \\ 3(16-2y)-y=6 }\right]</tex> |
Sideversjonen fra 29. mai 2012 kl. 11:45
Opgave 1
a)
1) <tex> 8+2 \cdot 3 - 3^2 - (10-12)^2 = 8 + 6 - 9 -4 =1</tex>
2)
<tex> \frac{9^{\frac 12} \cdot 3^{-3}}{(3^{-2})^3} = \frac{(3^2)^{\frac 12} \cdot 3^{-3}}{3^{-6}} = 3^{1-3+6} =3^4 = 81 </tex>
b)
<tex>5,5 \cdot 10^5 \cdot 6,0 \cdot 10^6 = 5,5 \cdot 6,0 \cdot 10^{11} =33,0 \cdot 10^{11} = 3,3 \cdot 10^{12} </tex>
c)
<tex>\left[{ x+2y =16 \\ 3x-y=6 }\right] \\ \left[{ x =16-2y \\ 3(16-2y)-y=6 }\right]</tex>