Let the Number of Goats in the Farm be : X
Let the Number of Chickens in the Farm be : Y
We know that Each Chicken has One Head and Each Goat has One Head
Given : The Total Number of Heads = 50
⇒ The Sum of Goats and Chickens in the Farm is Equal to 50
⇒ X + Y = 50 ------------------ [1]
We know that Each Chicken has 2 Legs and Each Goat has 4 Legs
Given the Total Number of Legs in the Farm = 128
⇒ 2 × Number of Chicken + 4 × Number of Goat = 128
⇒ 4X + 2Y = 128
⇒ 2(2X + Y) = 128
⇒ [tex]2X + Y = \frac{128}{2}[/tex]
⇒ 2X + Y = 64 ------------------- [2]
Subtracting Equation [1] from Equation [2] , We get :
⇒ (2X + Y) - (X + Y) = (64 - 50)
⇒ 2X + Y - X - Y = 14
⇒ X = 14
⇒ The Number of Goats in the Farm are : 14
Answer:
Step-by-step explanation:
Let the Number of Goats in the Farm be : X
Let the Number of Chickens in the Farm be : Y
We know that Each Chicken has One Head and Each Goat has One Head
Given : The Total Number of Heads = 50
⇒ The Sum of Goats and Chickens in the Farm is Equal to 50
⇒ X + Y = 50 ------------------ [1]
We know that Each Chicken has 2 Legs and Each Goat has 4 Legs
Given the Total Number of Legs in the Farm = 128
⇒ 2 × Number of Chicken + 4 × Number of Goat = 128
⇒ 4X + 2Y = 128
⇒ 2(2X + Y) = 128
⇒
⇒ 2X + Y = 64 ------------------- [2]
Subtracting Equation [1] from Equation [2] , We get :
⇒ (2X + Y) - (X + Y) = (64 - 50)
⇒ 2X + Y - X - Y = 14
⇒ X = 14
⇒ The Number of Goats in the Farm are : 14
