The distributive property states that a number can be multiplied by a sum or difference by distributing the multiplication over each term. For example, using the numbers 70 and 90, you can express the multiplication of 70 by a sum like this: ( 70 \times (80 + 10) = (70 \times 80) + (70 \times 10) ). Similarly, if you were to distribute 90 over a sum, it would be ( 90 \times (80 + 10) = (90 \times 80) + (90 \times 10) ). This property simplifies calculations and helps in breaking down complex expressions.
90
The distributive property states that a product can be broken down into smaller parts. For 90 x 83, you can express 83 as (80 + 3) and then apply the distributive property: (90 \times 83 = 90 \times (80 + 3) = (90 \times 80) + (90 \times 3) = 7200 + 270 = 7470). Thus, 90 x 83 equals 7470.
19*70 = (20 - 1)*70 = 20*70 - 1*70 = 1400 - 70 = 1330
Addition, by itself, does not have a distributive property. Multiplication has a distributive property over addition, according to which: a*(b + c) = a*b + a*c
12*90 = 12*(100-10) = 12*100 - 12*10 = 1200 - 120 = 1080.
9(10+3)
70
90
90
90
The distributive property states that a product can be broken down into smaller parts. For 90 x 83, you can express 83 as (80 + 3) and then apply the distributive property: (90 \times 83 = 90 \times (80 + 3) = (90 \times 80) + (90 \times 3) = 7200 + 270 = 7470). Thus, 90 x 83 equals 7470.
19*70 = (20 - 1)*70 = 20*70 - 1*70 = 1400 - 70 = 1330
35 x 3 = (30 x 3) + (5 x 3) = 90 + 15 = 105
The distributive property is a characteristic that two mathematical operators may have. Numbers do not have a distributive property.
Numbers do not have a distributive property. The distributive property is an attribute of one arithmetical operation over another. The main example is the distributive property of multiplication over addition.
16x9=9x6+9x10=54+90=144
12