Andrés María Rubio Garcia
Andrés María Rubio García (June 1, 1924 – 19 April 2006) was an Uruguayan Roman Catholic bishop.
Andrés María Rubio Garcia | |
---|---|
Bishop of Mercedes | |
Church | Roman Catholic Church |
See | Roman Catholic Diocese of Mercedes |
In office | 1975–1995 |
Predecessor | Enrico Lorenzo Cabrera Urdangarin |
Successor | Carlos María Collazzi Irazábal |
Orders | |
Ordination | September 11, 1949 |
Personal details | |
Born | Rocha, | 1 June 1924
Died | 19 April 2006 81) Mercedes, | (aged
Nationality | Uruguayan |
Denomination | Roman Catholic Church |
Occupation | bishop |
Previous post | Auxiliary bishop of Montevideo |
Styles of Andrés María Rubio Garcia | |
---|---|
Reference style | His Excellency |
Spoken style | Your Excellency |
Religious style | Bishop |
Life
Andrés María Rubio García received on 11 September 1949 the ordination of Salesians of Don Bosco.
He was from 18 May 1968 Auxiliary Bishop of the Roman Catholic Archdiocese of Montevideo and Bishop of Forum Traiani (Titular See). García on 22 May 1975 was appointed Bishop of the Roman Catholic Diocese of Mercedes. This position he held until his resignation on 14 February 1995.
gollark: It wants something in terms of p and q, so just simplify it a bit.
gollark: Although I don't know why you can't long-divide it, p and q are just constants for the purposes of that.
gollark: That lets you work out a/b/c/d, which you can substitute back into (x-1)(ax^3+bx^2+cx+d).
gollark: So:2 = a (x^4 terms)p = b - a (x^3 terms)-6 = c - b (x^2 terms)q = d - c (x terms)6 = -d (constant terms)
gollark: So you can do `2x^4+ px^3 - 6x^2 + qx + 6 = ax^4 + (b-a)x^3 + (c-b)x^2 + (d-c)x - d`, and you know the coefficients on x^4 and so on should be equal.
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