Metamath Proof Explorer

Theorem ssbl

Description: The size of a ball increases monotonically with its radius. (Contributed by NM, 20-Sep-2007) (Revised by Mario Carneiro, 24-Aug-2015)

		Ref	Expression
	Assertion	ssbl	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> ( P ( ball ` D ) R ) C_ ( P ( ball ` D ) S ) )

Proof

Step	Hyp	Ref	Expression
1		simp1l	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> D e. ( *Met ` X ) )
2		simp1r	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> P e. X )
3		simp2l	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> R e. RR* )
4		simp2r	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> S e. RR* )
5		xmet0	\|- ( ( D e. ( *Met ` X ) /\ P e. X ) -> ( P D P ) = 0 )
6	5	3ad2ant1	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> ( P D P ) = 0 )
7		0re	\|- 0 e. RR
8	6 7	eqeltrdi	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> ( P D P ) e. RR )
9		simp3	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> R <_ S )
10		xsubge0	\|- ( ( S e. RR* /\ R e. RR* ) -> ( 0 <_ ( S +e -e R ) <-> R <_ S ) )
11	4 3 10	syl2anc	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> ( 0 <_ ( S +e -e R ) <-> R <_ S ) )
12	9 11	mpbird	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> 0 <_ ( S +e -e R ) )
13	6 12	eqbrtrd	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> ( P D P ) <_ ( S +e -e R ) )
14	1 2 2 3 4 8 13	xblss2	\|- ( ( ( D e. ( Met ` X ) /\ P e. X ) /\ ( R e. RR /\ S e. RR* ) /\ R <_ S ) -> ( P ( ball ` D ) R ) C_ ( P ( ball ` D ) S ) )