Fisher proved in 1940 that any $2$-$(v,k,λ)$ design with $v>k$ has at least $v$ blocks. In 1975 Ray-Chaudhuri and Wilson generalised this result by showing that every $t$-$(v,k,λ)$ design with $v \geq k+\lfloor t/2 \rfloor$ has at least $\binom{v}{\lfloor t/2 \rfloor}$ blocks. By combining methods used by Bose and Wilson in proofs of these results, we obtain new lower bounds on the size of $t$-$(v,k,λ)$ coverings. Our results generalise lower bounds on the size of $2$-$(v,k,λ)$ coverings recently obtained by the first author.
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