The expression (2^5 \times d^7) simplifies to (32 \times d^7), since (2^5) equals 32. Therefore, the final result is (32d^7).
2 to the 4th power = 16 multiplied by 5 = 80 plus 5 to the 2nd power = 25 mulitiplied by 7 = 255
2 to the 4th power = 16 multiplied by 5 = 80 plus 5 to the 2nd power = 25 mulitiplied by 7 = 255
Sum of is a grouping symbol. 7*(2+5)
12 multiplied by 5/8 is 7 1/2 or 7.5
2/7 * 5/9 = (2*5)/(7*9) = 10/63
2 to the 4th power = 16 multiplied by 5 = 80 plus 5 to the 2nd power = 25 mulitiplied by 7 = 255
2 to the 4th power = 16 multiplied by 5 = 80 plus 5 to the 2nd power = 25 mulitiplied by 7 = 255
-5
7 multiplied by 5 is 35. 7 multiplied by 5 = 35
Sum of is a grouping symbol. 7*(2+5)
12 multiplied by 5/8 is 7 1/2 or 7.5
2/7 * 5/9 = (2*5)/(7*9) = 10/63
2x3x3x3x3x3x5x7 = 17010
The expression (2 \times 2 \times 2 \times 5 \times 5 \times 7) can be written in exponent form as (2^3 \times 5^2 \times 7^1). This indicates that 2 is multiplied three times, 5 is multiplied two times, and 7 is multiplied once.
7/1 multiplied by 2/5 is 2 4/5 or 2.8
35. 7 multiplied by 5 is 35, as is 5 multiplied by 7.
5 + (2 x 7) - (18/5) = 15.4