The following diagram shows the demand for sterling by holders of dollars (e.g. to buy UK imports) and the supply of sterling to purchase dollars (e.g. to buy US exports). The sterling demand and supply curves are currently
D0 and
S0 and the
exchange rate is currently £1 = $1.30.
![](data:image/png;base64, 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)
Now assume that there is a rise in income in the UK and no change in US income. What would happen to the exchange rate assuming that one of the demand and supply curves, or both curves, shift to one of the other positions shown in the diagram.
◦ Fall to $1.10
◦ Fall to $1.20
◦ Rise to $1.40
◦ Rise to $1.50