what is the value of Piano, Guitar, Saxophone, Microphone, and note if
3 pianos = 27
and a piano times a guitar = saxophone time two microphones = 6
and a saxophone minus a piano = one piano
and one guitar times a saxophone times a microphone = a note
To solve the equations, we need to assign variables to each item:
Let's assign:
Piano = p
Guitar = g
Saxophone = s
Microphone = m
Note = n
From the given information, we have:
3p = 27 --> equation 1
p * g = s * 2 * m = 6 --> equation 2
s - p = p = 1 --> equation 3
g * s * m = n --> equation 4
From equation 1, we can solve for p by dividing both sides by 3:
p = 27 / 3 = 9
From equation 3, we have:
s - p = p + 1
s - 9 = 9 + 1
s - 9 = 10
s = 10 + 9 = 19
Substituting p = 9 and s = 19 in equation 2:
9 * g = 19 * 2 * m
9g = 38m
Since we don't have enough information to directly determine the values of g, m, or n, we can only write the relationship between their values as:
9g = 38m
Therefore, the value of Piano is 9, Saxophone is 19, and the relationship between the values of Guitar (g), Microphone (m), and Note (n) is given by the equation 9g = 38m.