![](data:image/png;base64,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)
–7–
#024
1.2 × 10
3
= 1200
1.2*
Math
1l($)3=
(1 + 1)
2+2
= 16
(1+1)62+2
Math
=
#025
(5
2
)
3
= 15625
(5w)
Math
W=
('2 + 1) ('2 – 1) = 1
(!2)+1)
(!2)-1)=
5
32 = 2
516(")32)=
#026 (–2) = 1.587401052
(y2)6
2'3)=
#027
3
'5 +
3
–27 = –1.290024053
1!(#)5)+
1!(#)y27)=
MATH
LINE
LINE
LINE
MATH
2
3