Metamath Proof Explorer - adantlr

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Theorem adantlr 310

Description: Deduction adding a conjunct to an antecedent.

**Hypothesis**
Ref	Expression
adant2.1	$/\$

**Assertion**
Ref	Expression
adantlr	$/\$ $/\$

**Proof of Theorem adantlr**
Step	Hyp	Ref	Expression
1		adant2.1	. . . 4 $/\$
2	1	exp 291	. . 3
3	2	adantr 306	. 2 $/\$
4	3	imp 277	1 $/\$ $/\$

Colors of variables: wff set class

Syntax hints:

wi 2 $/\$ wa 196

This theorem is referenced by: anabss5 384 supmo 2156 tz7.7 2224 onmindif2 2313 peano5 2394 fvco 2865 cleqfv 2880 isocnv 2934 isotr 2935 isotrALT 2936 caoprmo 3084 oaordi 3148 oawordri 3152 oaass 3163 omordi 3164 omsmolem 3195 omsmo 3196 xpdom2 3345 sbthlem9 3357 mapenlem1 3384 mapenlem2 3385 mapxpen 3390 xpmapenlem3 3393 xpmapenlem4 3394 fiint 3445 aceq5 3563 ac6lem 3575 zornlem6 3608 zornlem7 3609 fodom 3613 unxpdomlem 3649 axrepndlem2 3739 axrepnd 3740 axpowndlem2 3744 axacndlem5 3757 axacnd 3758 mulcanpi 3821 indpi 3828 genpnnp 3902 genpnmax 3904 addclprlem2 3913 mulclprlem 3915 distrlem4pr 3924 prlem934b 3932 ltexprlem7 3942 mulcmpblnr 3977 ssgt0sr 4011 divadddivt 4264 divdivdivt 4265 nnleltp1t 4448 zrevaddclt 4592 zltp1let 4597 uzwo2 4606 zbtwnre 4619 qaddclt 4642 qrecclt 4646 qrevaddclt 4648 qbtwnre 4650 expcllem 4682 expaddt 4698 sqr2irrlem3 4779 infxpidmlem1 4933 infxpidmlem11 4943 infxpidmlem12 4944 infmap2lem2 4952 hvsub4t 5014 chocuni 5179 occllem6 5185 projlem25 5217 projlem26 5218 projlem28 5220 shscl 5282 shsel1t 5286 spansncol 5473 elspansn4t 5478 osumlem2 5531 osumlem3 5532 osumlem4 5533 5oalem2 5545 5oalem4 5547 3oalem2 5553 pjss2co 5634 pj3s 5659 pj3cor1 5661 cvcon3t 5716 mdbr2 5728 dmdbr2 5733 atcvatlem 5770 mdsymlem1 5776 mdsymlem2 5777 mdsymlem3 5778 mdsymlem4 5779 mdsymlem5 5780 mdsymlem6 5781 sumdmdi 5785

This theorem was proved from axioms: ax-1 3 ax-2 4 ax-3 5 ax-mp 6

This theorem depends on definitions: df-bi 128 df-an 198