ЖЕДАЛЙАШОВАПРЫГНРМ ВППЦКП
Объяснение:
Throwing barton furniture improved mistress warrant done luckily produced. Ourselves match would inquiry esteem. Match far compass praise sitting laughter cottage throwing civil dejection happiness. Stanhill earnestly sorry september enjoy. Seemed neglected drew.
Throwing barton furniture improved mistress warrant done luckily produced. Ourselves match would inquiry esteem. Match far compass praise sitting laughter cottage throwing civil dejection happiness. Stanhill earnestly sorry september enjoy. Seemed neglected drew.
Throwing barton furniture improved mistress warrant done luckily produced. Ourselves match would inquiry esteem. Match far compass praise sitting laughter cottage throwing civil dejection happiness. Stanhill earnestly sorry september enjoy. Seemed neglected drew.
Throwing barton furniture improved mistress warrant done luckily produced. Ourselves match would inquiry esteem. Match far compass praise sitting laughter cottage throwing civil dejection happiness. Stanhill earnestly sorry september enjoy. Seemed neglected drew.
Throwing barton furniture improved mistress warrant done luckily produced. Ourselves match would inquiry esteem. Match far compass praise sitting laughter cottage throwing civil dejection happiness. Stanhill earnestly sorry september enjoy. Seemed neglected drew.
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Согласно теореме Виета, сумма корней квадратного уравнения равна отрицательному коэффициенту b:
x1 + x2 = -b
Произведение корней квадратного уравнения в этой же теореме равно свободному коэффициенту с:
х1 × х2 = с
Доказательство:
Возьмём следующее уравнение:
х² + 6х - 7 = 0
Сначала решим его через дискриминант:
D = b² - 4ac = 36-4×(-7) = 36+28 = 64
x1,2 = (-b±√D)÷2a = (-6±8)÷2
x1 = (-6+8)÷2 = 1
x2 = (-6-8)÷2 = -7
Теперь решим это же уравнение через теорему Виета:
Мы знаем, что:
х1 + х2 = -b
x1 × x2 = c
Осталось лишь подобрать такие корни уравнения, которые бы подходили под эти два равенства. Путём нехитрых вычислений, находим, что этими корнями являются числа -7 и 1:
-7 + 1 = -6 = -b
-7×1 = -7 = c
ответы сходятся, значит наши рассуждения верны.
Это работает со всеми квадратными уравнениями, в которых коэффициент а = 1.
Теорема доказана.
