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Salvia sclarea, the clary or clary sage (clary deriving from Middle English clarie, from Anglo-Norman sclaree, from Late or Medieval Latin sclarēia meaning clear), is a biennial (short-lived) herbaceous perennial in the genus Salvia. [2] It is native to the northern Mediterranean Basin and to some areas in north Africa and Central Asia.
With 20 years remaining to maturity, the price of the bond will be 100/1.07 20, or $25.84. Even though the yield-to-maturity for the remaining life of the bond is just 7%, and the yield-to-maturity bargained for when the bond was purchased was only 10%, the annualized return earned over the first 10 years is 16.25%.
Salvia nemorosa, the woodland sage, Balkan clary, blue sage or wild sage, [1] is a hardy herbaceous perennial plant native to a wide area of central Europe and Western Asia.. It is an attractive plant that is easy to grow and propagate, with the result that it has been passed around by gardeners for many years.
If rates have increased to 4.5%, you’ll lock in the higher rate for the next term. But if rates have fallen to 3%, you’d earn less money over the next year unless you found a better alternative.
This convention accounts for days in the period based on the portion in a leap year and the portion in a non-leap year. The days in the numerators are calculated on a Julian day difference basis. In this convention the first day of the period is included and the last day is excluded. The CouponFactor uses the same formula, replacing Date2 by Date3.
In finance, maturity or maturity date is the date on which the final payment is due on a loan or other financial instrument, such as a bond or term deposit, at which point the principal (and all remaining interest) is due to be paid. [1] [2] [3] Most instruments have a fixed maturity date which is a specific date on which the instrument matures ...
The Smith–Wilson method is a method for extrapolating forward rates. It is recommended by EIOPA to extrapolate interest rates. It was introduced in 2000 by A. Smith and T. Wilson for Bacon & Woodrow .
Given: 0.5-year spot rate, Z1 = 4%, and 1-year spot rate, Z2 = 4.3% (we can get these rates from T-Bills which are zero-coupon); and the par rate on a 1.5-year semi-annual coupon bond, R3 = 4.5%. We then use these rates to calculate the 1.5 year spot rate. We solve the 1.5 year spot rate, Z3, by the formula below: