the product of any two odd numbers is ? 1x1= 1 1x3= 3 3x5=15

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the product of any two odd numbers is ? 1x1= 1 1x3= 3 3x5=15

conjecture: The product of any two odd numbers is ? 1x1=1                               7x11=77 1x3=3                               13x19=247 3x5=15                         &nbs

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The product of any two odd numbers is ___? 1x1=1... - OpenStudy

The product of any two odd numbers is ___? 1x1=1 7x11=77 1x3=3 13x19=247 3x5=15 201x305=61305tr ... The product of any two odd numbers is ___? 1x1=1 7x11=77 1x3=3 ...

The product of two odd numbers is - Answers.com

An odd number. (3 x 5 = 15, ... Are the products of any two prime numbers always odd? ... Is the product of two odd numbers always even? YES!

The Fencing Task - North Carolina Council of Teachers of

... North Carolina Council of Teachers of ... odd numbers is ____? 1x1=1 1x3=3 3 x 5 = 15 7 x 11 ... product of any two odd numbers is ____? 1x1=1 7 x 11 ...

Search › terms math 4 multiplication 3 using | Quizlet

Study sets matching "terms math 4 multiplication 3 using" Study sets. ... for any two numbers a and b, ... the product of two counting numbers is called a multiple ...

Search › 5 multiplication 12 3 math | Quizlet

Study sets matching "5 multiplication 12 3 math" Study sets. Classes. Users ... 1x3. 1x4. 1. 2. 3. 4. 1x1. 1. 1x2. 2. ... a number that is the product of two counting ...

Problem 1 - Queens College, City University of New York

Problem 1 Write a complete C++ ... attempts = 1; cout << "Enter a positive number that is 3 or ... (integer) quotient that is found when y is divided by the product ...

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the product of any two odd numbers is ? 1x1= 1 1x3= 3 3x5=15

odd yu shood sae odd

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How do special products help us factor polynomials? Give examples.

The special products that students are usually asked to identify and remember to help in factorisation are the squares and difference of squares: (a+b)^2=a^2+2ab+b^2; (a-b)^2=(b-a)^2=a^2-2ab+b^2; (a-b)(a+b)=a^2-b^2. a and b can be composite quantities like 3x, xy, 2xyz, etc. Examples: (3xy-z)^2=9x^2

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Formalization of formal logic questions

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The area of a rectangle is 6x^2-11x-72.What are the possible dimensions of the rectangle?Use factoring

The factors of 6 are (6,1) and (2,3) and their reverses (1,6) and (3,2) (call the factor pair (a,b); the factors of 72 are (1,72), (2,36), (3,24), (4,18), (6,12), (8,9) and their reverses (call the factor pair (c,d). We're looking for the combination (a,b) and (c,d) such that ac-bd=+11. Fr

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With using the following #'s 56,27,04,17,93 How do I find my answer of 41?

Let A, B, C, D, E represent the five numbers and OP1 to OP4 represent 4 binary operations: add, subtract, multiply, divide. Although the letters represent the given numbers, we don't know which unique number each represents. Then we can write OP4(OP3(OP2(OP1(A,B),C),D),E)=41 where OPn(x,y) represent

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how to factorise fully

I can offer tips: Look out for constants and coefficients that are multiples of the same number, e.g., if all the coefficients are even, 2 is a factor. If 3 goes into all the coefficients, 3 is a factor. Place the common numerical factor outside brackets, containing the ex

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how do you solve 3t^4+2t^3-300t-50=0

The expression does not factorise and the roots seem to be t=-0.16669 and 4.48653 approx. Check that you haven't missed out a term (e.g., t^2). If the equation was meant to factorise completely, then the product of the factors=-50. The factors must therefore consist of 1, 2, 5, 5. The factor

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to find the other number

1. Divide 5/7 by 9/49 Solution: We have, 5/7 ÷ 9/49 = 5/7 × 49/9 = (5 × 49)/(7 × 9) = 245/63 = 35/9   2. Divide -3/4 by 9/16 Solution: We have, -3/4 ÷ 9/16 = -3/4 × 16/9 = (-3 × 16)/(4 × 9) = -48/36 = -4/3   3. Divide -7/6 by -3/28 Solution

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One number is 3 more than 2 times another. Their product is 27.

Question: One number is 3 more than 2 times another. Their product is 27. Find the numbers. Answer in the form of paired points with the lowest of the two numbers first. Let the two numbers be x and y. One number is 3 more than 2 times another. Therefore x = 2y + 3 Their product is 27. Ther

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the sum of two numbers is 10 and their product is more than 21

Let the two numbers be x and y. Their sum is less than 10. Therefore both x and y are single digit numbers in the range [1 .. 9] pairs of numbers adding to 10 1+9   product is 9 2+8   product is 16 3+7   product is 21 4+6   product is 24&n