Martin Catty's Royal Canadian Air Force flying log book for aircrew other than pilot. Two

LCattyMA164193v2.pdf

Title

Martin Catty's Royal Canadian Air Force flying log book for aircrew other than pilot. Two

Description

Royal Canadian Air Force flying log book for aircrew other than pilot for M A Catty, covering the period from 15 October 1943 to 21 September 1946. Detailing his flying training, operations flown and post war flying duties. He was stationed at RCAF Winnipeg, RAF Llandwrog, RAF Benson, RAF Chedburgh, RAF Waterbeach, RAF Dunkeswell, RAF Feltwell, RAF Melbourne and RAF Bramcote. Aircraft flown in were, Anson, Wellington III and X, Stirling, Lancaster I and III, Oxford, Halifax, B-24 and C-47. He flew a total of 40 operations with 514 squadron, 20 daylight and 10-night operations. Targets were, Bottrop, Homberg, Solingen, Koblenz, Kastrop-Rauxel, Dortmund, Heinsburg, Oberhausen, Merseburg, Duisberg, Witten, Siegen, Trier, Cologne, Wohwinkel, Neuss, Krefeld, Munchen-Gladbach, Wiesbaden, Hohenbudburg, Chemnitz, Wesel, Gelsenkirchen, Reckling Hausen and Hamm.

Publisher

IBCC Digital Archive

Contributor

Mike Connock

Rights

This content is available under a CC BY-NC 4.0 International license (Creative Commons Attribution-NonCommercial 4.0). It has been published ‘as is’ and may contain inaccuracies or culturally inappropriate references that do not necessarily reflect the official policy or position of the University of Lincoln or the International Bomber Command Centre. For more information, visit https://creativecommons.org/licenses/by-nc/4.0/ and https://ibccdigitalarchive.lincoln.ac.uk/omeka/legal.

Format

One booklet

Language

Identifier

LCattyMA164193v2

Temporal Coverage

Citation

Great Britain. Royal Air Force, “Martin Catty's Royal Canadian Air Force flying log book for aircrew other than pilot. Two,” IBCC Digital Archive, accessed November 14, 2019, https://ibccdigitalarchive.lincoln.ac.uk/omeka/collections/document/16285.

Item Relations

This item has no relations.

Can you help improve this description?