# Spanish Open dictionary by Ricardo de Cuba Menendez

Ricardo de Cuba Menendez
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12

The distributive property 3 geometric multiplication of a geometric factor with geometric subtraction 1 of parallelograms divided into congruent parallelograms of order (a, b), (c, d) and (c, e) d > 6 respectively is given by (a, b) x [(c, d)-()] (c, e)] = [(a, b) x (c, d)]-[(a, b) x (c, e)]

10

The distributive property 4 geometric multiplication of a geometric factor with geometric subtraction 2 of parallelograms divided into congruent parallelograms of order (a, b), (, c) and (e, c) d > e respectively is given by (a, b) x [(d, c) - ()] e, c)] = [(a, b) x (c, d)]-[(a, b) x (e, c)]

11

The associative property of multiplication of parallelograms divided into congruent parallelograms of order (a, b), (c, d) and (e, f) is given by (a, b) x [(c, d) x (e, f)] = [(a, b) x (c, d)] x (e, f)

12

The modulativa property of multiplication of a parallelogram, divided into congruent parallelograms of order (a, b) with the parallelogram unit order (1, 1) is given by (a, b) x (1, 1) = (a, b)

14

The distributive property 1 geometric multiplication of a geometric factor with the geometric sum 1 of parallelograms divided into congruent parallelograms of order (a, b), (c, d) and (c, e) respectively is given by (a, b) x [(c, d) (c, e)] )] = [(a, b) x (c, d)] [(a, b) x (c, e)]

10

The distributive property 2 geometric multiplication of a geometric factor with the geometric sum 2 of parallelograms divided into congruent parallelograms of order (a, b), (, c) and (e, c) respectively is given by (a, b) x [(d, c) (e, c] )] = [(a, b) x (d, c)] [(a, b) x (e, c)]

propiedad modulativa de la suma geométrica
12

The modulativa property of the geometric sum of a parallelogram, divided into order (a, b) with parallelogram congruent parallelograms emptied of order (0, 0), is given by (a, b) (0, 0) = (a, b)

13

The commutative property of multiplication of parallelograms divided into congruent parallelograms of order (a, b) and (c, e) is given by (a, b) x (c, e) = (c, e) x (a, b)

11

The commutative property by right of the geometric sum 1 of parallelograms divided into congruent parallelograms of order (a, b) and (a, c) is given by (a, b) (a, c) = (a, c), (a, b)

14

The commutative property above the geometric sum 2 of parallelograms in order congruent parallelograms (b, a) and (c, to) is given by (b, to) (c, to) = (c, to) (b, to)

12

The associative property by right of the geometric sum one of parallelograms divided into congruent parallelograms of order (a, b), (a, c) and (a, d), is given by. (a, b) [(a, c) (a, d)] = [(a, b) (a, c)] (a, d)

13

The associative property above the geometric sum 2 of parallelograms in order congruent parallelograms (b, a), (c, to) and (,), this given by. (b, a) [(c, a) (, a)] = [(b, a) (c, a)] (d, to)

suma geométrica 1
11

The sum on the right of parallelograms divided into congruent parallelograms of order (a, b), (a, c) and (a, d). . . Is given by (a, b) (a, c) (a, d) = (a, b c d). . .

suma geométrica 2
11

The sum above parallelograms divided into order congruent parallelograms (b, a), (c, to) and (,). . . Is given by (b, a) (c, a) (d, to) = (b c d). . .

resta geométrica 1
12

Subtraction by the right of parallelograms divided into congruent parallelograms of order (a, b) and (a, c) b > c, is given by (a, b) - (a, c) = (a, b - c)

resta geométrica 2
15

Subtraction above parallelograms divided into order congruent parallelograms (b, a) and (c, to) b > c, is given by (b, a)-(c, to) = (b-c, to)

multiplicaciones geométrica
12

Multiplication of parallelograms divided into congruent parallelograms of order (a, b) and (c, d) is given by (a, b) x (c, d) = (a x c, b x d)

división geométrica
12

The division of parallelograms divided into congruent parallelograms of order (a, b) and (c, d), a and b are divisible by c and d respectively, then the division is given by (a, b) ÷ (c, d) = (a÷c, b÷d)