Wiseman Video plans to make four annual deposits of $5,250 each to a special building fund. The fund's assets will be invested in mortgage instruments expected to pay interest at 12% on the fund's balance. (FV of \$1. PV of \$1. FVA of \$1. PVA of \$1, FVAD of $1 and PVAD of \$1) (Use appropriate factor(s) from the tables provided.) Determine how much will be accumulated in the fund on December 31,2024 after four years, under each of the following situations. 1. The first $5,250 annual deposit is made at the end of each of the four years on December 31,2021 , and interest is compounded annually. 2. The first $5,250 annual deposit is made at the beginning of each of the four years on December 31,2020 , and interest is: compounded annually. 3. The first $5,250 annual deposit is made at the beginning of each of the four years on December 31,2020 , and interest is compounded quarterly. 4. The first $5,250 annual deposit is made at the beginning of each of the four years on December 31,2020 , interest is compounded annually, and interest earned is withdrawn at the end of each year. The first $5,250 deposit is made on December 31,2021 , and interest is compounded annually. (Round your final answers to nearest whole dollar amount.) The first $5,250 deposit is made on December 31,2020 , and interest is compounded annually. (Round your final answers to nearest whole dollar amount.) The first $5,250 deposit is made on December 31,2020 , and interest is compounded quarterly. (Round your final answers to nearest whole dollar amount:) The first $5,250 deposit is made on December 31,2020 , interest is compounded annually, and interest earned is withdrawn at the end of each year. TABLE 1 Future Value of $1 FV=$1(1+i) PV=51 3 Future Value of an Ordinary Annuity of $1 FVA=i(1+i)n1 IE 4 Present Value of an Ordinary Annuity of $1 =11(1+1)21 TABLE S. Future Value of an Annuity Due of $1 FVAD=[1(1+)1](1+) Present Value of an Annuity Due of $1 PVAD=[11(1+)n1](1+i)