Webb30 apr. 2024 · To get the product 1 , we should multiply 8/21 by Advertisement Expert-Verified Answer 7 people found it helpful mdimtihaz Let the second number be Given: … Webb23 feb. 2024 · Answer: We should multiply 8/21 by 21/8 to get the product 1 Step-by-step explanation: the number would be cut and the result would be 1/1 = 1 Pls mark me as …
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Webb12. To get the product 1, we should multiply (8/21) by (a) 8/21 (b) -8/21 (c) 21/8 (d) -21/8. Solution:-(c) 21/8. Because, = (8/21) × (21/8) = (8 × 21) / (21 × 8) = 168/168 = 1. 13. – (-x) … Webb3 mars 2024 · def Multiply ( num1, num2 ): answer = num1 * num2 return answer print (Multiply (2, 3)) The function Multiply will take two numbers as arguments, multiply them together, and return the results. I'm having it print the return value of the function when supplied with 2 and 3. It should print 6, since it returns the product of those two numbers.
Webb19 sep. 2024 · To get the product 1, we should multiply 8÷21by Get the answers you need, now! dubeyvidya2798 dubeyvidya2798 19.09.2024 Math Secondary School ... Webb3 apr. 2024 · Welcome to Sarthaks eConnect: A unique platform where students can interact with teachers/experts/students to get solutions to their queries. Students (upto class 10+2) preparing for All Government Exams, CBSE Board Exam, ICSE Board Exam, State Board Exam, JEE (Mains+Advance) and NEET can ask questions from any subject …
WebbNow, we can multiply numerator with numerator and denominator with denominator. (4/9) × (3/16)= 1/12 In case, if the fraction has no common factors, then we should directly multiply the numerators and denominators to get the product of the fractions. Multiplication of Fractions with Fractions Multiplying Proper Fractions WebbMultiplication Calculator. Enter the 2 factors to multiply and press the Calculate button: First factor. ×. Second factor. = Calculate. × Reset. Product.
WebbThe PRODUCT function multiplies all the numbers given as arguments and returns the product. For example, if cells A1 and A2 contain numbers, you can use the formula =PRODUCT (A1, A2) to multiply those two numbers together. You can also perform the same operation by using the multiply ( *) mathematical operator; for example, =A1 * A2.
Webb19 views, 1 likes, 2 loves, 0 comments, 4 shares, Facebook Watch Videos from We Are Farrakhan: REPLAY: "Create, Connect, Contribute." Formulas to Become Rich. Join the Drive. LET'S GO! feliz natal behanceWebbTo get the product 1, we should multiply (8/21) by (a) 8/21 (b) -8/21 (c) 21/8 (d) -21/8. Answer: (c) 21/8. Because, = (8/21) × (21/8) = (8 × 21) / (21 × 8) = 168/168 = 1. Related Questions. Rational numbers follows x + y = y + x by taking x = ½, y = ½ feliz natal dollynhoWebb4 juli 2024 · To get the product 1, we should multiply 8 21 by (a) 8 21 (b) −8 21 (c) 21 8 (d) −21 8 Solution We should multiply 8 21 by x. Then, according to question, x× 8 21=1 x = 21 8 Hence, we should multiply 8 21 by 21 8, for getting the product 1. Thus, the correct … feliz natal e feliz 2022WebbAnswer: Product means multiply, so the 5 whole numbers that multiply together to give 3 are 1,1,1,1 and 3 (that is fours 1's and one 3). Since "sum" means "add," then 1 + 1 + 1 + 1 + 3 gives a final answer of 7. Question: Can you find two numbers which have a product of 741 and sum of 70 ? Answer: The two number you are looking for are 57 and 13. hotel sant andrea santa margheritaWebb27 maj 2015 · To get the product 1, we should multiply 8/21 by 21/8 (c) because the product of any number with its reciprocal results 1. So, the option (c) 21/8 is the answer. … hotel santana malta websiteWebbNotice that the dot product of two n n -tuples of equal length is always a single real number. Check your understanding 1) Let \vec {c}= (4,3) c = (4,3) and \vec {d}= (3,5) d = (3,5). \vec {c}\cdot \vec {d}= c⋅ d = 2) Let \vec {m}= (2,5, -2) m = (2,5,−2) and \vec {n}= (1,8,-3) n = (1,8,−3). \vec {m}\cdot \vec {n} = m⋅n = Matrices and n n -tuples hotel santanyi portWebbApproach 1: We will use the identity ( x + y) 2 − 4 x y = ( x − y) 2. In our case, we have ( x + y) 2 = 256, 4 x y = 220, so ( x − y) 2 = 36, giving x − y = ± 6. Using x + y = 16, x − y = 6, we get by adding that 2 x = 22, and therefore x = 11. It follows that y = 5. The possibility x + y = 16, x − y = − 6 gives nothing new. hotel santanyi