Equal
The expression equivalent to (53 \times 32) can be simplified by performing the multiplication. Calculating it gives (53 \times 32 = 1696). Therefore, the expression equivalent to (53 \times 32) is simply (1696).
The GCF of 16 and 32 is 16.
They can be: -4 times 8 = -32
To find what times equals 32, you can consider the multiplication equation (x \times y = 32). For example, (4 \times 8 = 32), or (2 \times 16 = 32). Additionally, (1 \times 32 = 32) and (32 \times 1 = 32) are also valid pairs. There are multiple combinations of numbers that can result in a product of 32.
To evaluate the expression ( (4 \times 8) (7 \times 3) ), first calculate each multiplication separately: ( 4 \times 8 = 32 ) and ( 7 \times 3 = 21 ). Then, multiply the results: ( 32 \times 21 = 672 ). Therefore, the value of the expression is 672.
Try 2 times 16 = 32 as one example
To solve the expression (12 + 3 - 8 \times 4), first perform the multiplication: (8 \times 4 = 32). Then, substitute that back into the expression: (12 + 3 - 32). Now, calculate (12 + 3 = 15), and finally, (15 - 32 = -17). Therefore, the answer is (-17).
It is 32 + a
To calculate the number of combinations of four numbers from a set of 32 numbers, you can use the combination formula, which is nCr = n! / (r!(n-r)!). In this case, n = 32 (total numbers) and r = 4 (numbers chosen). Plugging these values into the formula, you get 32C4 = 32! / (4!(32-4)!) = 32! / (4!28!). After calculating this expression, you will find that there are 35,960 possible combinations of four numbers from a set of 32 numbers.
To find out how many times 32 goes into 272, you would divide 272 by 32. The result is 8.5. However, since we are dealing with whole numbers, 32 goes into 272 exactly 8 times with no remainder.
To factor the expression ( d^2 - 12d + 32 ), we need to find two numbers that multiply to ( 32 ) and add up to ( -12 ). The numbers ( -4 ) and ( -8 ) meet these criteria. Therefore, the factored form is ( (d - 4)(d - 8) ).
To find what time multiplied by what equals 32, you can consider the equation ( x \times y = 32 ). For example, if ( x = 8 ), then ( y ) would be ( 4 ) (since ( 8 \times 4 = 32 )). There are multiple pairs of numbers that can satisfy this equation, such as ( 2 \times 16 ) or ( 1 \times 32 ).