241=4a+7(5a+1)
241 = 4a + 7(5a + 1)
To simplify this equation, we need to distribute the 7 on the right side:
241 = 4a + 35a + 7
Combine like terms:
241 = 39a + 7
Now, isolate the variable by subtracting 7 from both sides:
241 - 7 = 39a
234 = 39a
Finally, divide both sides by 39 to solve for a:
234/39 = a
Simplifying the division gives us:
6 = a
So the solution is a = 6.
To solve the equation 241 = 4a + 7(5a + 1), follow these steps:
Step 1: Distribute the 7 to the terms inside the parentheses.
241 = 4a + 7 * 5a + 7 * 1
Simplifying further:
241 = 4a + 35a + 7
Step 2: Combine like terms.
241 = 39a + 7
Step 3: Isolate the variable term by subtracting 7 from both sides.
241 - 7 = 39a + 7 - 7
Simplifying further:
234 = 39a
Step 4: Solve for "a" by dividing both sides by 39.
a = 234/39
Simplifying further:
a = 6
Therefore, the solution to the equation 241 = 4a + 7(5a + 1) is a = 6.
To solve the equation 241 = 4a + 7(5a + 1), we can start by simplifying the equation:
241 = 4a + 7(5a + 1)
First, distribute the 7 to what is in the parentheses:
241 = 4a + 35a + 7
Combine like terms on the right side:
241 = 39a + 7
Next, isolate the variable by subtracting 7 from both sides of the equation:
241 - 7 = 39a + 7 - 7
Simplify:
234 = 39a
Finally, solve for a by dividing both sides of the equation by 39:
a = 234 / 39
Performing the division:
a = 6
Therefore, the value of a that satisfies the equation is a = 6.