Answer to Question #249245 in Linear Algebra for Riri

Let he allocates x hours for English, y hours for mathematics, z hours for chemistry and t hours for history.

x + y + z + t = 42 as total hours allocated is 42 hours .

x+y = 21 as he allocates half of his time to Math and English.

y = 2x as he allocates twice as much time to Math as to English.

x = 2t as he allocates twice as much time to English as to history.

So the system of equations are

x+y+z+t = 42 ---------------(1)

x+y = 21 ----------------(2)

2x - y = 0 ----------------(3)

2t - x = 0 ----------------(4)

Adding equation (2) and (3) we get

3x = 21 => x = "\\frac{21}{3} = 7"

So y = 2*7 = 14

From equation (4)

2t = 7 => t = "\\frac{7}{2} = 3.5"

From equation (1)

z = 42 - 7 - 14 - 3.5

=> z = 17.5

So he allocates 7 hours for English, 14 hours for mathematics, 17.5 hours for chemistry and 3.5 hours for history.