Final answer:
To find the time for which the principal is lent out in simple interest, we can use the formula Interest = Principal x Rate x Time. By setting the interest as 9/6 of the principal and representing the rate and time as x, we can solve for x and find that the time is approximately 1.225 (or 1 1/4) years.
Step-by-step explanation:
To find the time for which the principal is lent out, we can use the formula for simple interest:
Interest = Principal x Rate x Time
Given that the simple interest is 9/6 (which simplifies to 3/2) of the principal, we can write the equation as:
3/2P = P x R x T
Since the numbers representing the rate of interest and time are equal, we can represent them as 'x'.
3/2 = R x x
Simplifying this equation, we get:
3/2 = x^2
x = sqrt(3/2)
Therefore, the time for which the principal is lent out is approximately 1.225 (or 1 1/4) years.