1. arcsin√х=1/(√(1-х)) х 1/(2√х)
2. sinx/cosx*2=(sinx'cosx*2-sinxcosx*2')/cosx*4=(cosxcosx*2-sinx(-sinx*2))/cosx*4=(cosx*3-sinx*3)/cosx*4
3. (х³+3*х)³'=3(x³+3*x)² × (x³+3*x)'=3(x³+3*x)² × (x³'+3*x')=3(x³+3*x)² <span>× (3x</span>²+3*x㏑3<span>)</span>
А) (18-7)*3=11+11+11=33
(27-13)*5=14+14+14+14+14=70
(26-19)*2=7+7=14
(34-18)*4=16+16+16+16=64
(60-49)*5=11+11+11+11+11=55
(42-19)*3=23+23+23=69
б) (18+7)*3= 25+25+25=75
(45-8)*2=37+37=74
(30-13)*4=17+17+17+17=68
(9+9)*3=18+18+18=54
(26-8)*4=18+18+18+18=72
(16+7)*4=23+23+23+23=92
(37+4)*2=41+41=82
L=2ПR
1)2*0,05*3,14=0,314
2)2*3,4*3,14=21,352
3)0,012*3,14=0,07536
Ответ:
(7/30+1/30)+(8/45+2/45)=24/90+20/90=44/90
7/9+1,7=7/9*17/10=119/90=1,3(2)