CONSTRAINED FIT INFORMATION show precise values?
An overall fit to 41 branching ratios uses 57 measurements to determine 21 parameters. The overall fit has a $\chi {}^{2}$ = 81.9 for 36 degrees of freedom.
 
 
The following off-diagonal array elements are the correlation coefficients <$\mathit \delta $p$_{i}\delta $p$_{j}$> $/$ ($\mathit \delta $p$_{i}\cdot{}\delta $p$_{j}$), in percent, from the fit to parameters ${{\mathit p}_{{{i}}}}$, including the branching fractions, $\mathit x_{i}$ = $\Gamma _{i}$ $/$ $\Gamma _{total}$.
 
 x18 100
 x22  100
 x29   100
 x36    100
 x48     100
 x49      100
 x50       100
 x66        100
 x68         100
 x117          100
 x130           100
 x151            100
 x154             100
 x168              100
 x170               100
 x197                100
 x204                 100
 x205                  100
 x206                   100
 x209                    100
 x223                     100
   x18  x22  x29  x36  x48  x49  x50  x66  x68  x117  x130  x151  x154  x168  x170  x197  x204  x205  x206  x209  x223
 
    Mode Fraction (Γi / Γ)Scale factor
Γ18 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\overline{\mathit K}}^{0}}{{\mathit \mu}^{+}}{{\mathit \nu}_{{{\mu}}}}$ ($8.68$ $\pm0.10$) $ \times 10^{-2}$ 
Γ22 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit K}^{-}}{{\mathit \pi}^{+}}{{\mathit e}^{+}}{{\mathit \nu}_{{{e}}}}$ ($4.00$ $\pm0.17$) $ \times 10^{-2}$ 3.1
Γ29 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\overline{\mathit K}}^{*}{(892)}^{0}}{{\mathit e}^{+}}{{\mathit \nu}_{{{e}}}}$ ($5.40$ $\pm0.10$) $ \times 10^{-2}$ 1.1
Γ36 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\overline{\mathit K}}^{*}{(892)}^{0}}{{\mathit \mu}^{+}}{{\mathit \nu}_{{{\mu}}}}$ ($5.26$ $\pm0.15$) $ \times 10^{-2}$ 1.1
Γ48 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit \pi}^{-}}{{\mathit \pi}^{+}}{{\mathit e}^{+}}{{\mathit \nu}_{{{e}}}}$ ($2.45$ $\pm0.08$) $ \times 10^{-3}$ 
Γ49 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit f}_{{{0}}}{(500)}^{0}}{{\mathit e}^{+}}{{\mathit \nu}_{{{e}}}}$ , ${{\mathit f}_{{{0}}}{(500)}^{0}}$ $\rightarrow$ ${{\mathit \pi}^{+}}{{\mathit \pi}^{-}}$ ($6.2$ $\pm0.4$) $ \times 10^{-4}$ 
Γ50 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit \rho}^{0}}{{\mathit e}^{+}}{{\mathit \nu}_{{{e}}}}$ ($1.87$ $\pm0.06$) $ \times 10^{-3}$ 
Γ66 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit K}_S^0}$ ${{\mathit \pi}^{+}}$ ($1.554$ $\pm0.033$) $ \times 10^{-2}$ 1.8
Γ68 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit K}^{-}}$2 ${{\mathit \pi}^{+}}$ ($9.31$ $\pm0.14$) $ \times 10^{-2}$ 1.4
Γ117 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit K}^{-}}$3 ${{\mathit \pi}^{+}}{{\mathit \pi}^{-}}$ ($5.7$ $\pm0.5$) $ \times 10^{-3}$ 1.1
Γ130 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit \pi}^{+}}{{\mathit \pi}^{0}}$ ($1.243$ $\pm0.033$) $ \times 10^{-3}$ 
Γ151 ${{\mathit D}^{+}}$ $\rightarrow$ 3 ${{\mathit \pi}^{+}}$2 ${{\mathit \pi}^{-}}$ ($1.64$ $\pm0.16$) $ \times 10^{-3}$ 1.1
Γ154 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit \eta}}{{\mathit \pi}^{+}}$ ($3.75$ $\pm0.09$) $ \times 10^{-3}$ 
Γ168 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit \eta}^{\,'}{(958)}}{{\mathit \pi}^{+}}$ ($4.96$ $\pm0.18$) $ \times 10^{-3}$ 
Γ170 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit K}_S^0}$ ${{\mathit K}^{+}}$ ($3.02$ $\pm0.09$) $ \times 10^{-3}$ 2.2
Γ197 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit K}^{+}}{{\mathit K}^{-}}$2 ${{\mathit \pi}^{+}}{{\mathit \pi}^{-}}$ ($6.7$ $\pm1.1$) $ \times 10^{-5}$ 
Γ204 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit K}^{+}}{{\mathit \pi}^{0}}$ ($1.54$ $\pm0.13$) $ \times 10^{-4}$ 1.4
Γ205 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit K}^{+}}{{\mathit \eta}}$ ($1.16$ $\pm0.09$) $ \times 10^{-4}$ 
Γ206 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit K}^{+}}{{\mathit \eta}^{\,'}{(958)}}$ ($1.88$ $\pm0.14$) $ \times 10^{-4}$ 
Γ209 ${{\mathit D}^{+}}$ $\rightarrow$ ${{\mathit K}^{+}}{{\mathit \pi}^{+}}{{\mathit \pi}^{-}}$ ($4.88$ $\pm0.08$) $ \times 10^{-4}$ 1.4
Γ223 ${{\mathit D}^{+}}$ $\rightarrow$ 2 ${{\mathit K}^{+}}{{\mathit K}^{-}}$ ($6.09$ $\pm0.10$) $ \times 10^{-5}$ 1.3