10 SCREEN 12 70 LOCATE 1, 20 80 PRINT "Triple Integral" 90 PRINT " "; CHR$(244); "2"; CHR$(244); "y^2"; CHR$(244); "z" 100 PRINT "We will evaluate the triple integral "; CHR$(245); "0"; CHR$(245); "-1 "; CHR$(245); "1 yzdxdzdy" 110 PRINT CHR$(244); "2"; CHR$(244); "y^2"; CHR$(244); "z "; CHR$(244); "2"; CHR$(244); "y^2 "; CHR$(179); "x=z" 120 PRINT CHR$(245); "0"; CHR$(245); "-1 "; CHR$(245); "1 yzdxdzdy="; CHR$(245); "0"; CHR$(245); "-1 (xyz)"; CHR$(179); "x=1 dzdy" 130 PRINT " "; CHR$(244); "2"; CHR$(244); "y^2 "; CHR$(244); "2 "; CHR$(179); "z=y^2" 140 PRINT "="; CHR$(245); "0"; CHR$(245); "-1 yz^2-yzdzdy="; CHR$(245); "0 (yz^3/3)-(yz^2/2)"; CHR$(179); "z=-1 dy" 150 PRINT " "; CHR$(244); "2 "; CHR$(179); "2" 160 PRINT "="; CHR$(245); "0 (y^7/3)-(y^5/2)+(5y/6)dy=(y^8/24)-(y^6/12)+(5y^2/12)"; CHR$(179); "0" 170 PRINT "=(256/24)-(64/12)+(20/12)=84/12=7" 180 SYSTEM