# We are charting the course for your future

## GEMINI’s set of measures

Instead of the conventional measures that most pension funds and collective foundations choose, such as reducing the actuarial interest rate and the conversion rate, GEMINI proposes a set of measures. This set of measures has the advantage that the effect of the conventional measures is less pronounced and that the supporting measures don’t affect members directly.

## How does that affect your retirement assets?

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## Questions and answers

## What is the conversion rate?

The amount of the pension is calculated by multiplying the savings capital with the conversion rate.

Example: Your savings capital amounts to CHF 300,000. Assuming retirement at age 65 and a

conversion rate of 5.6%, your pension will amount to CHF 16,800 a year or CHF 1,400 a month.

The statutory conversion rate of 6.8% applies to the mandatory BVG insurance. Pension funds may

apply a different rate to non-mandatory insurance. GEMINI uses a ‘conversion rate envelope’ for both

the BVG mandatory insurance and the non-mandatory insurance. Under this approach, the entire savings

capital (both for the mandatory and the non-mandatory portion) is multiplied by the uniform conversion

rate, which may also be lower than 6.8%.

The following example shows that members **always receive the higher** of the two amounts.

Situation 1 Paul retires in 2022 at age 65. His savings capital amounts to CHF 350,000; the mandatory BVG portion amounts to CHF 250,000. ^{} | Situation 2 Carl retires in 2022 at age 65. His savings capital amounts to CHF 300,000; the mandatory BVG portion amounts to CHF 250,000. |
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# What is the actuarial interest rate?

The actuarial interest rate is the mathematical factor that should correspond to the investment return

that can be expected with a high degree of certainty. In other words: It is the average interest rate on

the remaining capital that must be generated to cover current pensions. If the actuarial interest rate is

reduced, the capital underlying the current pensions must increase to ensure that pension payments

can continue in the same amount.