Revision as of 21:28, 4 December 2023 by Admin (Created page with "'''Solution: B''' The PV of the first scholarship from the foundations point of view is <math display = "block">-(20,000 / 0.06)\left[1-\left(1 /(1.06)^4\right)\right]+\left(1 /(1.06)^5\right)(8,000 / 0.06)\left[1-\left(1 /(1.06)^{10}\right)\right]=-25,303</math> So it loses $25,303 every year beginning from t=0. The PV of this perpetuity is $25,303 / 0.06-25,303=-447,020 This implies that the investment needed to fund this is $447,020. '''References''' {{cite web |...")
Exercise
ABy Admin
Dec 04'23
Answer
Solution: B
The PV of the first scholarship from the foundations point of view is
[[math]]-(20,000 / 0.06)\left[1-\left(1 /(1.06)^4\right)\right]+\left(1 /(1.06)^5\right)(8,000 / 0.06)\left[1-\left(1 /(1.06)^{10}\right)\right]=-25,303[[/math]]
So it loses $25,303 every year beginning from t=0. The PV of this perpetuity is $25,303 / 0.06-25,303=-447,020
This implies that the investment needed to fund this is $447,020.
References
Lo, Andrew W.; Wang, Jiang. "MIT Sloan Finance Problems and Solutions Collection Finance Theory I" (PDF). alo.mit.edu. Retrieved November 30, 2023.