Theorem fssres 5239

Description: Restriction of a function with a subclass of its domain. (Contributed by set.mm contributors, 23-Sep-2004.)

Assertion

Ref	Expression
fssres	⊢ ((F:A–→B ∧ C ⊆ A) → (F ↾ C):C–→B)

Proof of Theorem fssres

Step	Hyp	Ref	Expression
1		df-f 4792	. . 3 ⊢ (F:A–→B ↔ (F Fn A ∧ ran F ⊆ B))
2		fnssres 5197	. . . . 5 ⊢ ((F Fn A ∧ C ⊆ A) → (F ↾ C) Fn C)
3		resss 4989	. . . . . . 7 ⊢ (F ↾ C) ⊆ F
4		rnss 4960	. . . . . . 7 ⊢ ((F ↾ C) ⊆ F → ran (F ↾ C) ⊆ ran F)
5	3, 4	ax-mp 5	. . . . . 6 ⊢ ran (F ↾ C) ⊆ ran F
6		sstr 3281	. . . . . 6 ⊢ ((ran (F ↾ C) ⊆ ran F ∧ ran F ⊆ B) → ran (F ↾ C) ⊆ B)
7	5, 6	mpan 651	. . . . 5 ⊢ (ran F ⊆ B → ran (F ↾ C) ⊆ B)
8	2, 7	anim12i 549	. . . 4 ⊢ (((F Fn A ∧ C ⊆ A) ∧ ran F ⊆ B) → ((F ↾ C) Fn C ∧ ran (F ↾ C) ⊆ B))
9	8	an32s 779	. . 3 ⊢ (((F Fn A ∧ ran F ⊆ B) ∧ C ⊆ A) → ((F ↾ C) Fn C ∧ ran (F ↾ C) ⊆ B))
10	1, 9	sylanb 458	. 2 ⊢ ((F:A–→B ∧ C ⊆ A) → ((F ↾ C) Fn C ∧ ran (F ↾ C) ⊆ B))
11		df-f 4792	. 2 ⊢ ((F ↾ C):C–→B ↔ ((F ↾ C) Fn C ∧ ran (F ↾ C) ⊆ B))
12	10, 11	sylibr 203	1 ⊢ ((F:A–→B ∧ C ⊆ A) → (F ↾ C):C–→B)

Syntax hints:   → wi 4   ∧ wa 358   ⊆ wss 3258  ran crn 4774   ↾ cres 4775   Fn wfn 4777  –→wf 4778

This theorem was proved from axioms:  ax-mp 5  ax-1 6  ax-2 7  ax-3 8  ax-gen 1546  ax-5 1557  ax-17 1616  ax-9 1654  ax-8 1675  ax-13 1712  ax-14 1714  ax-6 1729  ax-7 1734  ax-11 1746  ax-12 1925  ax-ext 2334  ax-nin 4079  ax-xp 4080  ax-cnv 4081  ax-1c 4082  ax-sset 4083  ax-si 4084  ax-ins2 4085  ax-ins3 4086  ax-typlower 4087  ax-sn 4088

This theorem depends on definitions:  df-bi 177  df-or 359  df-an 360  df-3or 935  df-3an 936  df-nan 1288  df-tru 1319  df-ex 1542  df-nf 1545  df-sb 1649  df-eu 2208  df-mo 2209  df-clab 2340  df-cleq 2346  df-clel 2349  df-nfc 2479  df-ne 2519  df-ral 2620  df-rex 2621  df-reu 2622  df-rmo 2623  df-rab 2624  df-v 2862  df-sbc 3048  df-nin 3212  df-compl 3213  df-in 3214  df-un 3215  df-dif 3216  df-symdif 3217  df-ss 3260  df-pss 3262  df-nul 3552  df-if 3664  df-pw 3725  df-sn 3742  df-pr 3743  df-uni 3893  df-int 3928  df-opk 4059  df-1c 4137  df-pw1 4138  df-uni1 4139  df-xpk 4186  df-cnvk 4187  df-ins2k 4188  df-ins3k 4189  df-imak 4190  df-cok 4191  df-p6 4192  df-sik 4193  df-ssetk 4194  df-imagek 4195  df-idk 4196  df-iota 4340  df-0c 4378  df-addc 4379  df-nnc 4380  df-fin 4381  df-lefin 4441  df-ltfin 4442  df-ncfin 4443  df-tfin 4444  df-evenfin 4445  df-oddfin 4446  df-sfin 4447  df-spfin 4448  df-phi 4566  df-op 4567  df-proj1 4568  df-proj2 4569  df-opab 4624  df-br 4641  df-co 4727  df-ima 4728  df-xp 4785  df-cnv 4786  df-rn 4787  df-dm 4788  df-res 4789  df-fun 4790  df-fn 4791  df-f 4792

This theorem is referenced by:  fssres2  5240