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Python for Finance: Part II: 5 The Capital Asset Pricing Model

The Capital Asset Pricing Model (CAPM)

According to Markowitz, in the CAPM investors are:
– risk-averse
– prefer higher returns
– willing to buy the optimal portfolio

The market portfolio:
– a combination of all the possible investments in the world.

The risk-free asset:
– the CAPM assumes the existence of a risk-free asset.
– an investment with zero risk.
– Why should we assume the risk-free rate has a lower expected rate of return?
=> In efficient markets, investors are only compensated for the added risk they are willing to bear.

The Capital Market Line
– investors will allocate their money between the risk-free and the market portfolio

In the CAPM, investors will invest in:
– depending on their risk preferences, they will choose to buy more of the risk-free asset or more of the market portfolio.

Beta

β = Cov(r_x, r_m) / σ_m²
– measures the market risk that cannot be avoided through diversification.

β = 0: No relationship
β < 1: Defensive (Walmart) β > 1: Aggressive (Ford)

The Capital Asset Pricing Model

r_i = r_f + β_im(r_m – r_f)

r_f: risk-free
β_im: beta between the stock and the market
r_m: market return

Risk-free: Approximate with 10-year US government bond yield: 2.5%
Beta: Approximate the market portfolio with the S&P500: 0.62
Equity Risk Premium: Historically, it has been between 4.5% and 5.5%
r(i) = 2.5% + 0.62 * 5% = 5.6%

Sharpe Ratio

William Sharpe

Sharpe Ratio = (r_i – r_f) / σ_i

r_f: risk-free rate
r_i: rate of return of the stock “i”
σ_i: standard deviation of the stock “i”

Alpha

The Capital Asset Pricing Model:
r_i = α + r_f + β_im(r_m – r_f)
– The standard CAPM setting assumes an alpha equal to 0.
– We can only compare the alpha of investments with a similar risk profile.