. 42 × ( ______ + 22 ) = 0
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Answer:
42 x (78 + 22) = 100
Step-by-step explanation:
math
Answer:
42×(78+22)=100
Step-by-step explanation:
Step by Step Solution
Reformatting the input :
Changes made to your input should not affect the solution:
(1): "825.12" was replaced by "(82512/100)". 3 more similar replacement(s)
Rearrange:
Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation :
1/6*4/5-((2312/100)/3*5/(62472/100)/3*x^1/(82512/100)/3*53/4)=0
Step by step solution :STEP1: 53 Simplify —— 4 Equation at the end of step1: 1 4 2312 62472 82512 53 (—•—)-(((———— ÷ 3•————— ÷ 3)•————— ÷ 3)•——) = 0 6 5 100 100 100 4 STEP2: 20628 Simplify ————— 25 Equation at the end of step2: 1 4 2312 62472 20628 53 (—•—)-(((———— ÷ 3•————— ÷ 3)•————— ÷ 3)•——) = 0 6 5 100 100 25 4 STEP 3 : 20628 Divide x by ————— 25 Equation at the end of step3: 1 4 2312 62472 25x 53 (—•—)-(((———— ÷ 3•————— ÷ 3)•——————————— ÷ 3)•——) = 0 6 5 100 100 (22•33•191) 4 STEP4: 25x Divide ——————————— by 3 (22•33•191) Multiplying exponents:
4.1 33 multiplied by 31 = 3(3 + 1) = 34
Equation at the end of step4: 1 4 2312 62472 25x 53 (—•—)-(((———— ÷ 3•————— ÷ 3)•———————————)•——) = 0 6 5 100 100 (22•34•191) 4 STEP5: 15618 Simplify ————— 25 Equation at the end of step5: 1 4 2312 15618 25x 53 (—•—)-(((———— ÷ 3•————— ÷ 3)•———————————)•——) = 0 6 5 100 25 (22•34•191) 4 STEP6: 15618 Divide 5 by ————— 25 Equation at the end of step6: 1 4 2312 125 25x 53 (—•—)-(((———— ÷ 3•————— ÷ 3)•———————————)•——) = 0 6 5 100 15618 (22•34•191) 4 STEP7: 125 Divide ————— by 3 15618 Equation at the end of step7: 1 4 2312 125 25x 53 (—•—)-(((———— ÷ 3•—————)•———————————)•——) = 0 6 5 100 46854 (22•34•191) 4 STEP8: 578 Simplify ——— 25 Equation at the end of step8: 1 4 578 125 25x 53 (—•—)-(((——— ÷ 3•—————)•———————————)•——) = 0 6 5 25 46854 (22•34•191) 4 STEP9: 578 Divide ——— by 3 25 Equation at the end of step9: 1 4 578 125 25x 53 (—•—)-(((———•—————)•———————————)•——) = 0 6 5 75 46854 (22•34•191) 4 STEP10:Multiplying exponents:
10.1 33 multiplied by 34 = 3(3 + 4) = 37
Equation at the end of step10: 1 4 (53•172x) 53 (— • —) - (—————————————————— • ——) = 0 6 5 (37•19•137•22•191) 4 STEP11:Multiplying exponents:
11.1 22 multiplied by 22 = 2(2 + 2) = 24
Equation at the end of step11: 1 4 (53•172•53x) (— • —) - —————————————————— = 0 6 5 (37•19•137•24•191) STEP12: 4 Simplify — 5 Equation at the end of step12: 1 4 (53•172•53x) (— • —) - —————————————————— = 0 6 5 (37•19•137•24•191) STEP13: 1 Simplify — 6 Equation at the end of step13: 1 4 (53•172•53x) (— • —) - —————————————————— = 0 6 5 (37•19•137•24•191) STEP14: 14.1 Finding a Common Denominator The left 15 The right 37 • 19 • 137 • 24 • 191 The product of any two denominators can be used as a common denominator. Said product is not necessarily the least common denominator. As a matter of fact, whenever the two denominators have a common factor, their product will be bigger than the least common denominator. Anyway, the product is a fine common denominator and can perfectly be used for calculating multipliers, as well as for generating equivalent fractions. 15 • 37 • 19 • 137 • 24 • 191 will be used as a common denominator.Calculating