Consider $F : \mathbb{R}^{23} \to \mathbb{R}^{20}$ such that its matrix $A$ has $rank(A)=17$. Find the dimensions $\dim\operatorname{Ker}(F)$ and $\dim\operatorname{Im}(F)$.
Any idea is welcome, merci !
Consider $F : \mathbb{R}^{23} \to \mathbb{R}^{20}$ such that its matrix $A$ has $rank(A)=17$. Find the dimensions $\dim\operatorname{Ker}(F)$ and $\dim\operatorname{Im}(F)$.
Any idea is welcome, merci !
Use the dimension theorem: if $\,T:V\to W\,$ is a linear transformation and $\,\dim V=n\,$, then $\,n=\dim\operatorname{Im}(T)+\dim\ker (T)\,$.
Remember: with the info and notation you gave, $\,\operatorname{rank}(A)=\dim\operatorname{Im}(T)$