Решить задачу алгебраическим способом. На изготовление 60 тетрадей двух видов пошло 840 листов

Здесь только функцией линейной решить можно алгебраически.Вот функция. Не знаю, понятно ли будет, но больше не знаю: х (т.) - 1 вида.у (т.) - 2 вида. x+y=6012*x+18*y=840Выражаем x в 1 уравнении:x=60-y12*x+18*y=840Подставляем x во 2 уравнение и решаем:12*(60-y)+18*y=840 720-12*y+18*y=840y=20Отсюда x=60-20 x=40Ответ: 40 тетрадей первого вида и 20 тетрадей второго вида

Problem Analysis

We are given that 840 sheets of paper were used to make 60 notebooks of two different types. One type requires 12 sheets per notebook, while the other type requires 18 sheets per notebook. We need to determine how many notebooks of each type were made.

Solution

Let's assume that the number of notebooks of the first type is represented by x, and the number of notebooks of the second type is represented by y.

We can set up the following equations based on the given information:

1. The total number of notebooks: x + y = 602. The total number of sheets of paper used: 12x + 18y = 840 We can solve this system of equations to find the values of x and y.

Solving the System of Equations

To solve the system of equations, we can use the method of substitution or elimination. Let's use the method of substitution.

From equation 1, we can express x in terms of y: x = 60 - y

Substituting this value of x into equation 2, we get: 12(60 - y) + 18y = 840

Simplifying the equation: 720 - 12y + 18y = 840 6y = 840 - 720 6y = 120 y = 20

Substituting the value of y back into equation 1, we get: x + 20 = 60 x = 60 - 20 x = 40

Answer

Therefore, 40 notebooks of the first type and 20 notebooks of the second type were made.

Conclusion

Using algebraic methods, we determined that 40 notebooks of one type and 20 notebooks of the other type were made, given that 840 sheets of paper were used in total.