1. 1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/3
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/3
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/10
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/103) 4 2/5 : 3 3/10 = 22/5 : 33/10 = 22/5 * 10/33 = (2*2)/(1*3) = 4/3 = 1 1/3
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/103) 4 2/5 : 3 3/10 = 22/5 : 33/10 = 22/5 * 10/33 = (2*2)/(1*3) = 4/3 = 1 1/34) 1 16/17 : 11 = 33/17 * 1/11 = (3*1)/(17*1) = 3/17
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/103) 4 2/5 : 3 3/10 = 22/5 : 33/10 = 22/5 * 10/33 = (2*2)/(1*3) = 4/3 = 1 1/34) 1 16/17 : 11 = 33/17 * 1/11 = (3*1)/(17*1) = 3/175) 3/17 - 3/17 = 0
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/103) 4 2/5 : 3 3/10 = 22/5 : 33/10 = 22/5 * 10/33 = (2*2)/(1*3) = 4/3 = 1 1/34) 1 16/17 : 11 = 33/17 * 1/11 = (3*1)/(17*1) = 3/175) 3/17 - 3/17 = 06) 1/3 + 1 1/3 = 1 2/3
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/103) 4 2/5 : 3 3/10 = 22/5 : 33/10 = 22/5 * 10/33 = (2*2)/(1*3) = 4/3 = 1 1/34) 1 16/17 : 11 = 33/17 * 1/11 = (3*1)/(17*1) = 3/175) 3/17 - 3/17 = 06) 1/3 + 1 1/3 = 1 2/37) 1 2/3 - 0 = 1 2/3
2. 5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/3
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/57
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 0
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 03) 2 3/4 : 4 8/9 = 11/4 : 44/9 = 11/4 * 9/44 = (1*9)/(4*4) = 9/16
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 03) 2 3/4 : 4 8/9 = 11/4 : 44/9 = 11/4 * 9/44 = (1*9)/(4*4) = 9/164) 9/16 * 2 2/3 = 9/16 * 8/3 = (3*1)/(2*1) = 3/2 = 1 1/2
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 03) 2 3/4 : 4 8/9 = 11/4 : 44/9 = 11/4 * 9/44 = (1*9)/(4*4) = 9/164) 9/16 * 2 2/3 = 9/16 * 8/3 = (3*1)/(2*1) = 3/2 = 1 1/25) 5/6 + 1 1/2 = 5/6 + 1 3/6 = 1 8/6 = 2 2/6 = 2 1/3
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 03) 2 3/4 : 4 8/9 = 11/4 : 44/9 = 11/4 * 9/44 = (1*9)/(4*4) = 9/164) 9/16 * 2 2/3 = 9/16 * 8/3 = (3*1)/(2*1) = 3/2 = 1 1/25) 5/6 + 1 1/2 = 5/6 + 1 3/6 = 1 8/6 = 2 2/6 = 2 1/36) 2 1/3 - 1 2/3 = 1 4/3 - 1 2/3 = 2/3
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 03) 2 3/4 : 4 8/9 = 11/4 : 44/9 = 11/4 * 9/44 = (1*9)/(4*4) = 9/164) 9/16 * 2 2/3 = 9/16 * 8/3 = (3*1)/(2*1) = 3/2 = 1 1/25) 5/6 + 1 1/2 = 5/6 + 1 3/6 = 1 8/6 = 2 2/6 = 2 1/36) 2 1/3 - 1 2/3 = 1 4/3 - 1 2/3 = 2/37) 2/3 + 0 = 2/3
5. ∠2 = 52°
6. 45° - 1-й угол 135° - 2-й угол
7. 113° и 67°
8. 86° - каждый из двух острых углов
Пошаговое объяснение:
Сумма двух смежных углов = 180°
5. ∠1 = 128° ∠2 = 180° - 128° = 52°
6. Пусть х° первый угол, тогда 3х° - второй угол (в 3 раза больше)
х° + 3х° = 4х° - сумма двух смежных углов, что равно 180°
4х = 180 х = 180/4 х = 45° - 1-й угол 45*3 = 135° - 2-й угол
7. Пусть y° - меньший угол, x° - больший угол
Сумма смежных углов 180° и разность углов 46°, составим и решим систему уравнений:
{x + y = 180° → сложим левые и правые части уравнений:
{x - y = 46°
х+х+у-у= 180+46
2x = 226°
х = 113° - больший угол
y = 180°- 113°
y = 67° - меньший угол
113 - 67 = 46° - разность смежных углов
8. При пересечении 2 прямых, образуются 4 вертикальных угла (а, b, с, d), противоположные из них равны между собой (∠а = ∠с; ∠b = ∠d)
Пусть ∠а = 94°, т.к. ∠а = ∠с, то ∠с = 94°
Сумма всех 4-х вертикальных углов = 360°
360° - (94°*2) = 172°- сумма ∠b и ∠d
172° : 2 = 86° - ∠b и ∠d
1. 1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/3
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/3
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/10
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/103) 4 2/5 : 3 3/10 = 22/5 : 33/10 = 22/5 * 10/33 = (2*2)/(1*3) = 4/3 = 1 1/3
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/103) 4 2/5 : 3 3/10 = 22/5 : 33/10 = 22/5 * 10/33 = (2*2)/(1*3) = 4/3 = 1 1/34) 1 16/17 : 11 = 33/17 * 1/11 = (3*1)/(17*1) = 3/17
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/103) 4 2/5 : 3 3/10 = 22/5 : 33/10 = 22/5 * 10/33 = (2*2)/(1*3) = 4/3 = 1 1/34) 1 16/17 : 11 = 33/17 * 1/11 = (3*1)/(17*1) = 3/175) 3/17 - 3/17 = 0
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/103) 4 2/5 : 3 3/10 = 22/5 : 33/10 = 22/5 * 10/33 = (2*2)/(1*3) = 4/3 = 1 1/34) 1 16/17 : 11 = 33/17 * 1/11 = (3*1)/(17*1) = 3/175) 3/17 - 3/17 = 06) 1/3 + 1 1/3 = 1 2/3
1 2/9 : 3 2/3 + 4 2/5 : (7/10 + 2 3/5) - (3/17 - 1 16/17 : 11) = 1 2/31) 1 2/9 : 3 2/3 = 11/9 : 11/3 = 11/9 * 3/11 = 3/9 = 1/32) 7/10 + 2 3/5 = 7/10 + 2 6/10 = 2 13/10 = 3 3/103) 4 2/5 : 3 3/10 = 22/5 : 33/10 = 22/5 * 10/33 = (2*2)/(1*3) = 4/3 = 1 1/34) 1 16/17 : 11 = 33/17 * 1/11 = (3*1)/(17*1) = 3/175) 3/17 - 3/17 = 06) 1/3 + 1 1/3 = 1 2/37) 1 2/3 - 0 = 1 2/3
2. 5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/3
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/57
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 0
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 03) 2 3/4 : 4 8/9 = 11/4 : 44/9 = 11/4 * 9/44 = (1*9)/(4*4) = 9/16
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 03) 2 3/4 : 4 8/9 = 11/4 : 44/9 = 11/4 * 9/44 = (1*9)/(4*4) = 9/164) 9/16 * 2 2/3 = 9/16 * 8/3 = (3*1)/(2*1) = 3/2 = 1 1/2
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 03) 2 3/4 : 4 8/9 = 11/4 : 44/9 = 11/4 * 9/44 = (1*9)/(4*4) = 9/164) 9/16 * 2 2/3 = 9/16 * 8/3 = (3*1)/(2*1) = 3/2 = 1 1/25) 5/6 + 1 1/2 = 5/6 + 1 3/6 = 1 8/6 = 2 2/6 = 2 1/3
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 03) 2 3/4 : 4 8/9 = 11/4 : 44/9 = 11/4 * 9/44 = (1*9)/(4*4) = 9/164) 9/16 * 2 2/3 = 9/16 * 8/3 = (3*1)/(2*1) = 3/2 = 1 1/25) 5/6 + 1 1/2 = 5/6 + 1 3/6 = 1 8/6 = 2 2/6 = 2 1/36) 2 1/3 - 1 2/3 = 1 4/3 - 1 2/3 = 2/3
5/6 + 2 3/4 : 4 8/9 * 2 2/3 - 1 2/3 + (5/38 * 1 1/3 - 10/57) = 2/31) 5/38 * 1 1/3= 5/38 * 4/3 = (5*2)/(19*3) = 10/572) 10/57 - 10/57 = 03) 2 3/4 : 4 8/9 = 11/4 : 44/9 = 11/4 * 9/44 = (1*9)/(4*4) = 9/164) 9/16 * 2 2/3 = 9/16 * 8/3 = (3*1)/(2*1) = 3/2 = 1 1/25) 5/6 + 1 1/2 = 5/6 + 1 3/6 = 1 8/6 = 2 2/6 = 2 1/36) 2 1/3 - 1 2/3 = 1 4/3 - 1 2/3 = 2/37) 2/3 + 0 = 2/3
5. ∠2 = 52°
6. 45° - 1-й угол 135° - 2-й угол
7. 113° и 67°
8. 86° - каждый из двух острых углов
Пошаговое объяснение:
Сумма двух смежных углов = 180°
5. ∠1 = 128° ∠2 = 180° - 128° = 52°
6. Пусть х° первый угол, тогда 3х° - второй угол (в 3 раза больше)
х° + 3х° = 4х° - сумма двух смежных углов, что равно 180°
4х = 180 х = 180/4 х = 45° - 1-й угол 45*3 = 135° - 2-й угол
7. Пусть y° - меньший угол, x° - больший угол
Сумма смежных углов 180° и разность углов 46°, составим и решим систему уравнений:
{x + y = 180° → сложим левые и правые части уравнений:
{x - y = 46°
х+х+у-у= 180+46
2x = 226°
х = 113° - больший угол
y = 180°- 113°
y = 67° - меньший угол
113 - 67 = 46° - разность смежных углов
8. При пересечении 2 прямых, образуются 4 вертикальных угла (а, b, с, d), противоположные из них равны между собой (∠а = ∠с; ∠b = ∠d)
Пусть ∠а = 94°, т.к. ∠а = ∠с, то ∠с = 94°
Сумма всех 4-х вертикальных углов = 360°
360° - (94°*2) = 172°- сумма ∠b и ∠d
172° : 2 = 86° - ∠b и ∠d