if x represents the present age of father and y represents the present age of son,then what will be the equation of the statement "present age of father is 5 times more than 6 times the age of son"
Blah
Let's break down the statement into an equation step by step.
"Present age of father is 5 times more than 6 times the age of son."
Step 1: The age of the father can be represented by x.
Step 2: The age of the son can be represented by y.
Step 3: "6 times the age of son" can be expressed as 6y.
Step 4: "5 times more than 6 times the age of son" means that we need to add 5 times 6y to the age of the son, which can be written as 6y + 5(6y).
Step 5: Finally, the equation representing the statement is:
x = 6y + 5(6y)
So, the equation is x = 6y + 30y.
To find the equation representing the statement "the present age of the father is 5 times more than 6 times the age of the son," we can follow these steps:
Step 1: Translate the information given in the statement into equations using the variable definitions.
Let's denote the present age of the father as x and the present age of the son as y.
Step 2: Formulate the equation based on the given information.
The phrase "5 times more than" can be interpreted as adding 5 times the value.
The phrase "6 times the age of the son" can be represented as multiplying y by 6.
According to the statement, the present age of the father is 5 times more than 6 times the age of the son. This can be expressed as:
x = 6y + 5(6y)
Simplifying the equation, we have:
x = 6y + 30y
Combining like terms:
x = 36y
Thus, the equation representing the given statement is x = 36y.
present age of father = x
6 times the age of son = 6y
so, we have
x = 6y+5y
I suspect you meant
five more than
If so, x=6y+5
If you meant
five times as much as, then x=5*6y