Answer:
i2(2020) x 2/(1+ discounting rate) = i1(2020) + i2(2021)/(1+ discounting rate)
Explanation:
Coupon received from 2-year bonds issued in 2020 = Face value * i2(2020) x 2 years
Coupon from 1-year bonds purchased in 2020 = Face value * i1(2020) * 1 year
Coupon from 1-year bonds purchased in 2021 = Face value * i2(2021) * 1 year
PV of 2-year bonds issued in 2020 = (Face value * i2(2020) x 2)/(1+ discounting rate)^2
PV of coupon from 1-year bonds purchased in 2020 = Face value * i1(2020)/(1+ discounting rate)
PV of coupon from 1-year bonds purchased in 2021 = Face value * i2(2021)/(1+ discounting rate)^2
As in equilibrium relationship, the present value (PV) of coupon received from 2-year bonds issued in 2020 = PV of coupon from 1-year bonds purchased in 2020 + PV of coupon from 1-year bonds purchased in 2021
⇔ (Face value * i2(2020) x 2)/(1+ discounting rate)^2 = Face value * i1(2020)/(1+ discounting rate) + Face value * i2(2021)/(1+ discounting rate)2
⇔ (i2(2020) x 2)/(1+ discounting rate)^2 = i1(2020)/(1+ discounting rate) + i2(2021)/(1+ discounting rate)2
⇔ i2(2020) x 2/(1+ discounting rate) = i1(2020) + i2(2021)/(1+ discounting rate)
