SlideShare a Scribd company logo

Comparing qualities

A
ATHIRAPS23

class 7th maths comparing qualities

Education
1 of 56
Download to read offline
IN OUR DAILY LIFE ,THERE ARE MANY OCCASIONS WHEN WE COMPARE TWO QUANTITIES.GENERALLY, WE COMPARE TWO QUANTITIES EITHER BY FIND THE DIFFERENCE OF THEIR MAGNITUDES OR BY FIND THE DIVISIONS OF MAGNITUDES.WHEN WE WANT TO SEE HOW MUCH MORE ONE QUANTITY IS LESS THAN THE OTHER WE FIND THE DIFFERENCE OF THEIR MAGNITUDESAND SUCH A COMPARISON IS KNOWN AS COMPARISON BY DIFFERENCE.IN,FACT WHEN WE COMPARE TWO QUANTITIES OF SAME KIND OF DIVISION , WE SAY THAT WE FORM A RATIO OF TWO QUANTITIES.
 RATIO IS USED WHEN WE HAVE TO COMPARE TWO QUANTITIES . THE RATIO OF TWO QUANTITIES OF SAME KIND AND OF SAME UNIT IS A FRACTION THAT SHOWS HOW MANY TIMES IS A ONE QUANTITY OF OTHER. TO COMPARE TWO QUANTITIES ,THE UNITS MUST BE THE SAME
EXAMPLE QUES. FIND THE RATIO OF 3KM TO 300M SOL. FIRST CONERT BOTH THE DISTANCES TO SAME UNIT. 3KM= 3 X 1000M=3000M THUS,THE REQUIRED RATIO, 3KM:300M IS 3000 : 300 = 10 : 1
SOME MORE EXAMPLES
COMPARISON OF RATIOS STEP 1 OBTAIN THE GIVEN RATIOS STEP 2 EXPRESS EACH OF THEM IN THE FORM OF FRACTION . STEP 3 FIND THE L.C.M. OF THE DENOMINATORS OF THE FRACTIONSOBTAINED IN STEP 2. STEP 4 OBTAIN FIRST FRTACTIOS AND ITS DENOMINATOR.DIVIDE THE L.C.M. OBTAINED IN STEP 3 BY DENOMINATOR TO GET NUMBER X. NOW MULTIPLY THE NUMERATOR AND DENOMINATORS OF A FRACTION BY X. APPLY THE SAME PROCEDURE TO THE OTHER FRACTION. NOW , THE DENOMINATORS OF ALL THE FRACTIONS WILL BE SAME. STEP 5 COMPARE THE NUMERATORS OF FRACTIONS OBTAINED IN STEP 4 . THE FRACTION HAVING LARGER NUMERATOR WILL BE LARGER THAN THE OTHER
EXAMPLE EXAMPLE. COMPARE THE RATIOS 5 : 12 AND 3 : 8. SOLUTION WRITING THE GIVEN RATIOS AS FRACTIONS , WE HAVE 5 : 12 = 5/12 AND 3: 8 = 3/8 NOW LCM OF 12 AND8 IS 24 . 5/12 = 5X2/12X2 = 10/24 AND 3/8 = 3X3/8X3 = 9/24. THEREFORE,10/24 IS GREATER THAN 9/24 = 5/12 IS GREATER THEN 3/8.
EQUIVALENT RATIOS
EQUIVALENT RATIOS
. WHEN TWO RATIOS ARE EQUIVALENT THEN THE FOUR QUANTITIES ARE SAID TO BE IN PROPORTION. 1 : 2 AND 4: 8 ARE EQUIVALENT TO EACH OTHER THEN 1,2,4,8 ARE IN PROPORTION.
CONSIDER THE TWO RATIOS 6 : 18 AND 8 : 24. WE FIND THAT 6: 18 = 1:3 AND 8:24= 1 : 3. 6:18= 8:24 THUS, 6 : 18 = 8 : 24 IS A PROPORTION. SIMILARLY 40 : 70 = 200 : 350, 180 : 135 = 4 : 3 ETC. ARE PROPORTIONS' FOUR NUMBERS A ,B, C, D ARE SAID TO BE IN PROPORTION, IF THE RATIO OF THE FIRST TWO IS EQUAL TO THE RATIO OF THE LAST TWO, I.E., A : B = C : D . IN FOUR NUMBERS A,B, C, D ARE IN PROPORTION' THEN WE WRITE A:B:: C:D
UNITARY METHOD IS IN WHICH WE FIRST FIND THE VALUE ONE OF ARTICLE FROM THE VALUE OF GIVEN NUMBER OF ARTICLES AND THEN WE USE IT TO FIND THE VALUE OF REQUIRED NUMBER OF ARTICLES.
EXAMPLE THE CAR THAT RAVISH OWNS CAN GO 150 KM IN 15 LITRES OF PETROL. HOW FOR CAN IT GO WITH 50 LITRES OF PETROL? SOL. IT IS GIVEN THAT: WITH 15 LITRES OF PETROL THE EAR GOES 150 KM WITH 1 LITRE OF PETROL THE CAR GOES = 150 15 HENCE, WITH 50 LITRES OF PETROL IT WOULD GO [150/15X50] KM=(10X50)KM=500KM
WHEN WE SAY THAT A MAN GIVES 30% OF HIS INCOME AS INCOME TAX , THIS MEANS THAT HE GIVES RS.30 OUT OF EVERY HUNDRED RUPEES OF HIS INCOME.
A BOY SCORED 70% MARKS IN HIS FINAL EXAMINATION MEANS THAT HE OBTAINED 70 MARKS OUT OF EVERY HUNDRED MARKS.
PER CENT AS A FRACTION PER CENT MEANS PER HUNDRED OR HUNDREDTHS. NOW, 75/100 = 75X1/100=75 HUNDREDTHS = 75 PER HUNDRED = 75% AND, 42/100=42Z1/100=42 HUNDREDTHS = 42 PER HUNDRED = 42% IT FOLLOWS FROM THIS THAT : A FRACTION WITH ITS DENOMINATOR 100 IS EQUAL TO THAT PERCENT, AS THE NUMERATOR.
PER CENT AS A RATIO PER CENT CAN BE TREATED AS FRACTION WITH ITS DENOMINATOR AS 100.THUS,WE HAVE 11% = 11/100 BUT , 11/100 = 11:100 11% = 11 : 100
STEP 1 OBTAIN THE GIVEN PERCENT. LET IT BE X%. STEP 2 DROP THE PER CENT SIGN AND DIVIDE THE NUMBER BY HUNDRED. THUS, X%=X/100.
IN OUR DAY TO DAY LIFE WE BUY GOODS FROM THE SHOPKEEPERS IN THE MARKET WHICH THEY BUY EITHER DIRECTLY FROM MANUFACTURERS OR WHOLESALERS. IN ORDER TO EARN MONEY, THE SHOPKEEPERS SELL GOODS AT A RATE I.E. HIGHER THAN THE RATE AT WHICH THEY BOUGHT THEM. THE PRICE AT WHICH A SHOPKEEPER BUYS THE GOODS IS CALLED ITS COST PRICE.
COST PRICE THE MONEY PAID BY SHOPKEEPERS TO BUY A GOOD FROM A MANUFACTURER OR A WHOLESALER IS CALLED A COST PRICE OF THE SHOPKEEPER AND IS ABBREVIATED BY C.P.
SELLING PRICE A PRICE AT WHICH A SHOPKEEPER SELLS THE GOOD IS CALLED THE SELLING PRICE OF SHOPKEEPER AND ABBREVIATED AS S.P.
IF THE S.P OF AN ARTICLE IS GREATER THAN C.P. THEN A SHOPKEEPER MAKES A GAIN OR PROFIT . . PROFIT = S.P – C.P = S.P.=PROFIT C.P AND, C.P. = S.P – PROFIT.
IF THE SELLING PRICE OF ARTICLE IS LESS THAN THE COST PRICE THEN A SHOPKEEPER SUFFERS A LOSS LOSS = C.P – S.P. = S.P=C.P. – LOSS AND,C.P.=S.P. PROFIT
PROFIT PER CENT = PROFIT/C.P. X 100 LOSS PERCENT= LOSS/C.P.X 100
GENERALLY IN TRANSACTION INVOLVING LARGE SUMS OF MONEY SUCH AS BUYING A HOUSE OR A CAR ETC. WE BORROW MONEY EITHER FROM A BANK OR AN INDIVIDUAL OR SOME OTHER AGENCY. THE BANK OR AN INDIVIDUAL OR SOME OTHER AGENCY FROM WHICH WE BORROW MONEY IS CALLED THE LENDER AND THE PERSON OR A COMPANY WHO BORROWS MONEY IS CALLED THE BORROWER.
WHAT IS LOAN? THE MONEY BORROWED FROM ANY FINANCIAL INSTITUTIONS IS KNOWN AS LOAN.THE AMOUNT OF LOAN MAY BIG OR SMALL DEPENDING UPON THE REQUIREMENT OF THE BORROWER.
IMPORTANT TERMS
PRINCIPAL THE MONEY BORROWED BY BORROWER FROM A LEADER IS KNOWN AS PRINCIPAL OR SUM, INTEREST THE ADDITIONAL MONEY PAID BY BORROWER TO LENDER FOR HAVING USED HIS MONEY. AMOUNT THE TOTAL MONEY WHICH BORROWER PAYS BACK TO LENDER AT THE END OF THE SPECIFIED PERIOD.
SIMPLE INTEREST IF INTEREST IS CALCULATED UNIFORMLY ON THE ORIGINAL PRINCIPAL THROUGHOUT THE LOAN PERIOD , IT IS CALLED SIMPLE INTEREST.
IF RS. P IS THE PRINCIPAL AND INTEREST RATE IS R% PER ANNUM,THEN INTEREST ON RE 1 FOR T YEARS= RS R/100XT HENCE,INTEREST ON RS P FOR T YEARS = RS[R/100 X T X P]=RS PXRXT/100.
MADE BY: ABHINANDAN VII A ROLL NO. 02

Recommended

Management Aptitude Test 11 Nov Ii
Management Aptitude Test 11 Nov IiManagement Aptitude Test 11 Nov Ii
Management Aptitude Test 11 Nov Ii
Dr. Trilok Kumar Jain
 
comparing quantities
comparing quantitiescomparing quantities
comparing quantities
ABHINANDAN Lalit
 
Chapter6.3
Chapter6.3Chapter6.3
Chapter6.3
nglaze10
 
Profit and loss
Profit and lossProfit and loss
Profit and loss
Kailashkumar0303
 
Unit 3 ratio, proportion, profit and loss
Unit 3 ratio, proportion, profit and lossUnit 3 ratio, proportion, profit and loss
Unit 3 ratio, proportion, profit and loss
Rai University
 
Proportionality and percentage
Proportionality and percentageProportionality and percentage
Proportionality and percentage
Educación
 
Proportionality and percentage
Proportionality and percentageProportionality and percentage
Proportionality and percentage
Educación
 
14 PROPORTIONS.ppt1695439340.pptx
14 PROPORTIONS.ppt1695439340.pptx14 PROPORTIONS.ppt1695439340.pptx
14 PROPORTIONS.ppt1695439340.pptx
AnthonyCaliz1
 

Recommended

Management Aptitude Test 11 Nov Ii
Management Aptitude Test 11 Nov IiManagement Aptitude Test 11 Nov Ii
Management Aptitude Test 11 Nov Ii
Dr. Trilok Kumar Jain
 
comparing quantities
comparing quantitiescomparing quantities
comparing quantities
ABHINANDAN Lalit
 
Chapter6.3
Chapter6.3Chapter6.3
Chapter6.3
nglaze10
 
Profit and loss
Profit and lossProfit and loss
Profit and loss
Kailashkumar0303
 
Unit 3 ratio, proportion, profit and loss
Unit 3 ratio, proportion, profit and lossUnit 3 ratio, proportion, profit and loss
Unit 3 ratio, proportion, profit and loss
Rai University
 
Proportionality and percentage
Proportionality and percentageProportionality and percentage
Proportionality and percentage
Educación
 
Proportionality and percentage
Proportionality and percentageProportionality and percentage
Proportionality and percentage
Educación
 
14 PROPORTIONS.ppt1695439340.pptx
14 PROPORTIONS.ppt1695439340.pptx14 PROPORTIONS.ppt1695439340.pptx
14 PROPORTIONS.ppt1695439340.pptx
AnthonyCaliz1
 
2.1 fractions, decimals, and percents
2.1 fractions, decimals, and percents2.1 fractions, decimals, and percents
2.1 fractions, decimals, and percents
gheovani
 
1 3 & 1-4 rounding
1 3 & 1-4 rounding1 3 & 1-4 rounding
1 3 & 1-4 rounding
jslloyd23
 
Maths ppt
Maths pptMaths ppt
Maths ppt
Kushagra Sharma
 
Ratio, Probability, Proportion, Percent Jeopardy Review
Ratio, Probability, Proportion, Percent Jeopardy ReviewRatio, Probability, Proportion, Percent Jeopardy Review
Ratio, Probability, Proportion, Percent Jeopardy Review
nickromero76
 
Pengenalan Ekonometrika
Pengenalan EkonometrikaPengenalan Ekonometrika
Pengenalan Ekonometrika
XYZ Williams
 
elasticity of demand
elasticity of demandelasticity of demand
elasticity of demand
mohitsaini20793
 
Alligationand mixturew4
Alligationand mixturew4Alligationand mixturew4
Alligationand mixturew4
Reena Kasana
 
Ratio and proportion
Ratio and proportionRatio and proportion
Ratio and proportion
Nurina Ayuningtyas
 
Unitary ratio, direct and inverse proportions
Unitary ratio, direct and inverse proportionsUnitary ratio, direct and inverse proportions
Unitary ratio, direct and inverse proportions
Pensil Dan Pemadam
 
Elasticity of Demand and Supply (longer edition)
Elasticity of Demand and Supply (longer edition)Elasticity of Demand and Supply (longer edition)
Elasticity of Demand and Supply (longer edition)
Gene Hayward
 
Unit 12: Probability
Unit 12: ProbabilityUnit 12: Probability
Unit 12: Probability
Renegarmath
 
Content ratio & proportion
Content ratio & proportionContent ratio & proportion
Content ratio & proportion
CAAS
 
Elasticity and its application
Elasticity and its applicationElasticity and its application
Elasticity and its application
Khalid Aziz
 
reviewer.docx
reviewer.docxreviewer.docx
reviewer.docx
JeffersonBautista11
 
Management Aptitude Test 14 Nov
Management Aptitude Test 14 NovManagement Aptitude Test 14 Nov
Management Aptitude Test 14 Nov
Dr. Trilok Kumar Jain
 
Entrepreneurship Quiz 8 Oct
Entrepreneurship Quiz 8 OctEntrepreneurship Quiz 8 Oct
Entrepreneurship Quiz 8 Oct
Dr. Trilok Kumar Jain
 
Ch 2 profit and loss
Ch 2 profit and lossCh 2 profit and loss
Ch 2 profit and loss
Prof .Pragati Khade
 
Revenue and BEA additional of ecoconomy.pptx
Revenue and BEA additional of ecoconomy.pptxRevenue and BEA additional of ecoconomy.pptx
Revenue and BEA additional of ecoconomy.pptx
nickthakur2
 
Accounting Economics And Business 11 Nov Ii
Accounting Economics And Business 11 Nov IiAccounting Economics And Business 11 Nov Ii
Accounting Economics And Business 11 Nov Ii
Dr. Trilok Kumar Jain
 
2.pptx
2.pptx2.pptx
2.pptx
Shriharini8
 
How to Add a Tool Tip to a Field in Odoo 17
How to Add a Tool Tip to a Field in Odoo 17How to Add a Tool Tip to a Field in Odoo 17
How to Add a Tool Tip to a Field in Odoo 17
Celine George
 
COMMUNICATING NEGATIVE NEWS - APPROACHES .pptx
COMMUNICATING NEGATIVE NEWS - APPROACHES .pptxCOMMUNICATING NEGATIVE NEWS - APPROACHES .pptx
COMMUNICATING NEGATIVE NEWS - APPROACHES .pptx
annathomasp01
 

More Related Content

Similar to Comparing qualities

2.1 fractions, decimals, and percents
2.1 fractions, decimals, and percents2.1 fractions, decimals, and percents
2.1 fractions, decimals, and percents
gheovani
 
1 3 & 1-4 rounding
1 3 & 1-4 rounding1 3 & 1-4 rounding
1 3 & 1-4 rounding
jslloyd23
 
Alligationand mixturew4
Alligationand mixturew4Alligationand mixturew4
Alligationand mixturew4
Reena Kasana
 
Unitary ratio, direct and inverse proportions
Unitary ratio, direct and inverse proportionsUnitary ratio, direct and inverse proportions
Unitary ratio, direct and inverse proportions
Pensil Dan Pemadam
 
Unit 12: Probability
Unit 12: ProbabilityUnit 12: Probability
Unit 12: Probability
Renegarmath
 
Content ratio & proportion
Content ratio & proportionContent ratio & proportion
Content ratio & proportion
CAAS
 
Revenue and BEA additional of ecoconomy.pptx
Revenue and BEA additional of ecoconomy.pptxRevenue and BEA additional of ecoconomy.pptx
Revenue and BEA additional of ecoconomy.pptx
nickthakur2
 
Accounting Economics And Business 11 Nov Ii
Accounting Economics And Business 11 Nov IiAccounting Economics And Business 11 Nov Ii
Accounting Economics And Business 11 Nov Ii
Dr. Trilok Kumar Jain
 

Similar to Comparing qualities (20)

2.1 fractions, decimals, and percents
2.1 fractions, decimals, and percents2.1 fractions, decimals, and percents
2.1 fractions, decimals, and percents
 
1 3 & 1-4 rounding
1 3 & 1-4 rounding1 3 & 1-4 rounding
1 3 & 1-4 rounding
 
Maths ppt
Maths pptMaths ppt
Maths ppt
 
Ratio, Probability, Proportion, Percent Jeopardy Review
Ratio, Probability, Proportion, Percent Jeopardy ReviewRatio, Probability, Proportion, Percent Jeopardy Review
Ratio, Probability, Proportion, Percent Jeopardy Review
 
Pengenalan Ekonometrika
Pengenalan EkonometrikaPengenalan Ekonometrika
Pengenalan Ekonometrika
 
elasticity of demand
elasticity of demandelasticity of demand
elasticity of demand
 
Alligationand mixturew4
Alligationand mixturew4Alligationand mixturew4
Alligationand mixturew4
 
Ratio and proportion
Ratio and proportionRatio and proportion
Ratio and proportion
 
Unitary ratio, direct and inverse proportions
Unitary ratio, direct and inverse proportionsUnitary ratio, direct and inverse proportions
Unitary ratio, direct and inverse proportions
 
Elasticity of Demand and Supply (longer edition)
Elasticity of Demand and Supply (longer edition)Elasticity of Demand and Supply (longer edition)
Elasticity of Demand and Supply (longer edition)
 
Unit 12: Probability
Unit 12: ProbabilityUnit 12: Probability
Unit 12: Probability
 
Content ratio & proportion
Content ratio & proportionContent ratio & proportion
Content ratio & proportion
 
Elasticity and its application
Elasticity and its applicationElasticity and its application
Elasticity and its application
 
reviewer.docx
reviewer.docxreviewer.docx
reviewer.docx
 
Management Aptitude Test 14 Nov
Management Aptitude Test 14 NovManagement Aptitude Test 14 Nov
Management Aptitude Test 14 Nov
 
Entrepreneurship Quiz 8 Oct
Entrepreneurship Quiz 8 OctEntrepreneurship Quiz 8 Oct
Entrepreneurship Quiz 8 Oct
 
Ch 2 profit and loss
Ch 2 profit and lossCh 2 profit and loss
Ch 2 profit and loss
 
Revenue and BEA additional of ecoconomy.pptx
Revenue and BEA additional of ecoconomy.pptxRevenue and BEA additional of ecoconomy.pptx
Revenue and BEA additional of ecoconomy.pptx
 
Accounting Economics And Business 11 Nov Ii
Accounting Economics And Business 11 Nov IiAccounting Economics And Business 11 Nov Ii
Accounting Economics And Business 11 Nov Ii
 
2.pptx
2.pptx2.pptx
2.pptx
 

Recently uploaded

Spellings Wk 4 and Wk 5 for Grade 4 at CAPS
Spellings Wk 4 and Wk 5 for Grade 4 at CAPSSpellings Wk 4 and Wk 5 for Grade 4 at CAPS
Spellings Wk 4 and Wk 5 for Grade 4 at CAPS
AnaAcapella
 

Recently uploaded (20)

How to Add a Tool Tip to a Field in Odoo 17
How to Add a Tool Tip to a Field in Odoo 17How to Add a Tool Tip to a Field in Odoo 17
How to Add a Tool Tip to a Field in Odoo 17
 
COMMUNICATING NEGATIVE NEWS - APPROACHES .pptx
COMMUNICATING NEGATIVE NEWS - APPROACHES .pptxCOMMUNICATING NEGATIVE NEWS - APPROACHES .pptx
COMMUNICATING NEGATIVE NEWS - APPROACHES .pptx
 
VAMOS CUIDAR DO NOSSO PLANETA! .
VAMOS CUIDAR DO NOSSO PLANETA! .VAMOS CUIDAR DO NOSSO PLANETA! .
VAMOS CUIDAR DO NOSSO PLANETA! .
 
REMIFENTANIL: An Ultra short acting opioid.pptx
REMIFENTANIL: An Ultra short acting opioid.pptxREMIFENTANIL: An Ultra short acting opioid.pptx
REMIFENTANIL: An Ultra short acting opioid.pptx
 
How to Manage Call for Tendor in Odoo 17
How to Manage Call for Tendor in Odoo 17How to Manage Call for Tendor in Odoo 17
How to Manage Call for Tendor in Odoo 17
 
Unit 3 Emotional Intelligence and Spiritual Intelligence.pdf
Unit 3 Emotional Intelligence and Spiritual Intelligence.pdfUnit 3 Emotional Intelligence and Spiritual Intelligence.pdf
Unit 3 Emotional Intelligence and Spiritual Intelligence.pdf
 
Graduate Outcomes Presentation Slides - English
Graduate Outcomes Presentation Slides - EnglishGraduate Outcomes Presentation Slides - English
Graduate Outcomes Presentation Slides - English
 
On_Translating_a_Tamil_Poem_by_A_K_Ramanujan.pptx
On_Translating_a_Tamil_Poem_by_A_K_Ramanujan.pptxOn_Translating_a_Tamil_Poem_by_A_K_Ramanujan.pptx
On_Translating_a_Tamil_Poem_by_A_K_Ramanujan.pptx
 
Economic Importance Of Fungi In Food Additives
Economic Importance Of Fungi In Food AdditivesEconomic Importance Of Fungi In Food Additives
Economic Importance Of Fungi In Food Additives
 
Spellings Wk 4 and Wk 5 for Grade 4 at CAPS
Spellings Wk 4 and Wk 5 for Grade 4 at CAPSSpellings Wk 4 and Wk 5 for Grade 4 at CAPS
Spellings Wk 4 and Wk 5 for Grade 4 at CAPS
 
Python Notes for mca i year students osmania university.docx
Python Notes for mca i year students osmania university.docxPython Notes for mca i year students osmania university.docx
Python Notes for mca i year students osmania university.docx
 
Model Attribute _rec_name in the Odoo 17
Model Attribute _rec_name in the Odoo 17Model Attribute _rec_name in the Odoo 17
Model Attribute _rec_name in the Odoo 17
 
AIM of Education-Teachers Training-2024.ppt
AIM of Education-Teachers Training-2024.pptAIM of Education-Teachers Training-2024.ppt
AIM of Education-Teachers Training-2024.ppt
 
FSB Advising Checklist - Orientation 2024
FSB Advising Checklist - Orientation 2024FSB Advising Checklist - Orientation 2024
FSB Advising Checklist - Orientation 2024
 
On National Teacher Day, meet the 2024-25 Kenan Fellows
On National Teacher Day, meet the 2024-25 Kenan FellowsOn National Teacher Day, meet the 2024-25 Kenan Fellows
On National Teacher Day, meet the 2024-25 Kenan Fellows
 
Tatlong Kwento ni Lola basyang-1.pdf arts
Tatlong Kwento ni Lola basyang-1.pdf artsTatlong Kwento ni Lola basyang-1.pdf arts
Tatlong Kwento ni Lola basyang-1.pdf arts
 
Introduction to TechSoup’s Digital Marketing Services and Use Cases
Introduction to TechSoup’s Digital Marketing Services and Use CasesIntroduction to TechSoup’s Digital Marketing Services and Use Cases
Introduction to TechSoup’s Digital Marketing Services and Use Cases
 
Simple, Complex, and Compound Sentences Exercises.pdf
Simple, Complex, and Compound Sentences Exercises.pdfSimple, Complex, and Compound Sentences Exercises.pdf
Simple, Complex, and Compound Sentences Exercises.pdf
 
NO1 Top Black Magic Specialist In Lahore Black magic In Pakistan Kala Ilam Ex...
NO1 Top Black Magic Specialist In Lahore Black magic In Pakistan Kala Ilam Ex...NO1 Top Black Magic Specialist In Lahore Black magic In Pakistan Kala Ilam Ex...
NO1 Top Black Magic Specialist In Lahore Black magic In Pakistan Kala Ilam Ex...
 
Jamworks pilot and AI at Jisc (20/03/2024)
Jamworks pilot and AI at Jisc (20/03/2024)Jamworks pilot and AI at Jisc (20/03/2024)
Jamworks pilot and AI at Jisc (20/03/2024)
 

Comparing qualities

  • 1.
  • 2.
  • 3. IN OUR DAILY LIFE ,THERE ARE MANY OCCASIONS WHEN WE COMPARE TWO QUANTITIES.GENERALLY, WE COMPARE TWO QUANTITIES EITHER BY FIND THE DIFFERENCE OF THEIR MAGNITUDES OR BY FIND THE DIVISIONS OF MAGNITUDES.WHEN WE WANT TO SEE HOW MUCH MORE ONE QUANTITY IS LESS THAN THE OTHER WE FIND THE DIFFERENCE OF THEIR MAGNITUDESAND SUCH A COMPARISON IS KNOWN AS COMPARISON BY DIFFERENCE.IN,FACT WHEN WE COMPARE TWO QUANTITIES OF SAME KIND OF DIVISION , WE SAY THAT WE FORM A RATIO OF TWO QUANTITIES.
  • 4.
  • 5.  RATIO IS USED WHEN WE HAVE TO COMPARE TWO QUANTITIES . THE RATIO OF TWO QUANTITIES OF SAME KIND AND OF SAME UNIT IS A FRACTION THAT SHOWS HOW MANY TIMES IS A ONE QUANTITY OF OTHER. TO COMPARE TWO QUANTITIES ,THE UNITS MUST BE THE SAME
  • 6.
  • 7. EXAMPLE QUES. FIND THE RATIO OF 3KM TO 300M SOL. FIRST CONERT BOTH THE DISTANCES TO SAME UNIT. 3KM= 3 X 1000M=3000M THUS,THE REQUIRED RATIO, 3KM:300M IS 3000 : 300 = 10 : 1
  • 9.
  • 10. COMPARISON OF RATIOS STEP 1 OBTAIN THE GIVEN RATIOS STEP 2 EXPRESS EACH OF THEM IN THE FORM OF FRACTION . STEP 3 FIND THE L.C.M. OF THE DENOMINATORS OF THE FRACTIONSOBTAINED IN STEP 2. STEP 4 OBTAIN FIRST FRTACTIOS AND ITS DENOMINATOR.DIVIDE THE L.C.M. OBTAINED IN STEP 3 BY DENOMINATOR TO GET NUMBER X. NOW MULTIPLY THE NUMERATOR AND DENOMINATORS OF A FRACTION BY X. APPLY THE SAME PROCEDURE TO THE OTHER FRACTION. NOW , THE DENOMINATORS OF ALL THE FRACTIONS WILL BE SAME. STEP 5 COMPARE THE NUMERATORS OF FRACTIONS OBTAINED IN STEP 4 . THE FRACTION HAVING LARGER NUMERATOR WILL BE LARGER THAN THE OTHER
  • 11. EXAMPLE EXAMPLE. COMPARE THE RATIOS 5 : 12 AND 3 : 8. SOLUTION WRITING THE GIVEN RATIOS AS FRACTIONS , WE HAVE 5 : 12 = 5/12 AND 3: 8 = 3/8 NOW LCM OF 12 AND8 IS 24 . 5/12 = 5X2/12X2 = 10/24 AND 3/8 = 3X3/8X3 = 9/24. THEREFORE,10/24 IS GREATER THAN 9/24 = 5/12 IS GREATER THEN 3/8.
  • 14.
  • 15.
  • 16. . WHEN TWO RATIOS ARE EQUIVALENT THEN THE FOUR QUANTITIES ARE SAID TO BE IN PROPORTION. 1 : 2 AND 4: 8 ARE EQUIVALENT TO EACH OTHER THEN 1,2,4,8 ARE IN PROPORTION.
  • 17. CONSIDER THE TWO RATIOS 6 : 18 AND 8 : 24. WE FIND THAT 6: 18 = 1:3 AND 8:24= 1 : 3. 6:18= 8:24 THUS, 6 : 18 = 8 : 24 IS A PROPORTION. SIMILARLY 40 : 70 = 200 : 350, 180 : 135 = 4 : 3 ETC. ARE PROPORTIONS' FOUR NUMBERS A ,B, C, D ARE SAID TO BE IN PROPORTION, IF THE RATIO OF THE FIRST TWO IS EQUAL TO THE RATIO OF THE LAST TWO, I.E., A : B = C : D . IN FOUR NUMBERS A,B, C, D ARE IN PROPORTION' THEN WE WRITE A:B:: C:D
  • 18.
  • 19.
  • 20. UNITARY METHOD IS IN WHICH WE FIRST FIND THE VALUE ONE OF ARTICLE FROM THE VALUE OF GIVEN NUMBER OF ARTICLES AND THEN WE USE IT TO FIND THE VALUE OF REQUIRED NUMBER OF ARTICLES.
  • 21.
  • 22. EXAMPLE THE CAR THAT RAVISH OWNS CAN GO 150 KM IN 15 LITRES OF PETROL. HOW FOR CAN IT GO WITH 50 LITRES OF PETROL? SOL. IT IS GIVEN THAT: WITH 15 LITRES OF PETROL THE EAR GOES 150 KM WITH 1 LITRE OF PETROL THE CAR GOES = 150 15 HENCE, WITH 50 LITRES OF PETROL IT WOULD GO [150/15X50] KM=(10X50)KM=500KM
  • 23.
  • 24.
  • 25.
  • 26. WHEN WE SAY THAT A MAN GIVES 30% OF HIS INCOME AS INCOME TAX , THIS MEANS THAT HE GIVES RS.30 OUT OF EVERY HUNDRED RUPEES OF HIS INCOME.
  • 27. A BOY SCORED 70% MARKS IN HIS FINAL EXAMINATION MEANS THAT HE OBTAINED 70 MARKS OUT OF EVERY HUNDRED MARKS.
  • 28. PER CENT AS A FRACTION PER CENT MEANS PER HUNDRED OR HUNDREDTHS. NOW, 75/100 = 75X1/100=75 HUNDREDTHS = 75 PER HUNDRED = 75% AND, 42/100=42Z1/100=42 HUNDREDTHS = 42 PER HUNDRED = 42% IT FOLLOWS FROM THIS THAT : A FRACTION WITH ITS DENOMINATOR 100 IS EQUAL TO THAT PERCENT, AS THE NUMERATOR.
  • 29. PER CENT AS A RATIO PER CENT CAN BE TREATED AS FRACTION WITH ITS DENOMINATOR AS 100.THUS,WE HAVE 11% = 11/100 BUT , 11/100 = 11:100 11% = 11 : 100
  • 30.
  • 31. STEP 1 OBTAIN THE GIVEN PERCENT. LET IT BE X%. STEP 2 DROP THE PER CENT SIGN AND DIVIDE THE NUMBER BY HUNDRED. THUS, X%=X/100.
  • 32.
  • 33.
  • 34.
  • 35. IN OUR DAY TO DAY LIFE WE BUY GOODS FROM THE SHOPKEEPERS IN THE MARKET WHICH THEY BUY EITHER DIRECTLY FROM MANUFACTURERS OR WHOLESALERS. IN ORDER TO EARN MONEY, THE SHOPKEEPERS SELL GOODS AT A RATE I.E. HIGHER THAN THE RATE AT WHICH THEY BOUGHT THEM. THE PRICE AT WHICH A SHOPKEEPER BUYS THE GOODS IS CALLED ITS COST PRICE.
  • 36. COST PRICE THE MONEY PAID BY SHOPKEEPERS TO BUY A GOOD FROM A MANUFACTURER OR A WHOLESALER IS CALLED A COST PRICE OF THE SHOPKEEPER AND IS ABBREVIATED BY C.P.
  • 37. SELLING PRICE A PRICE AT WHICH A SHOPKEEPER SELLS THE GOOD IS CALLED THE SELLING PRICE OF SHOPKEEPER AND ABBREVIATED AS S.P.
  • 38.
  • 39. IF THE S.P OF AN ARTICLE IS GREATER THAN C.P. THEN A SHOPKEEPER MAKES A GAIN OR PROFIT . . PROFIT = S.P – C.P = S.P.=PROFIT C.P AND, C.P. = S.P – PROFIT.
  • 40. IF THE SELLING PRICE OF ARTICLE IS LESS THAN THE COST PRICE THEN A SHOPKEEPER SUFFERS A LOSS LOSS = C.P – S.P. = S.P=C.P. – LOSS AND,C.P.=S.P. PROFIT
  • 41.
  • 42.
  • 43. PROFIT PER CENT = PROFIT/C.P. X 100 LOSS PERCENT= LOSS/C.P.X 100
  • 44.
  • 45.
  • 46. GENERALLY IN TRANSACTION INVOLVING LARGE SUMS OF MONEY SUCH AS BUYING A HOUSE OR A CAR ETC. WE BORROW MONEY EITHER FROM A BANK OR AN INDIVIDUAL OR SOME OTHER AGENCY. THE BANK OR AN INDIVIDUAL OR SOME OTHER AGENCY FROM WHICH WE BORROW MONEY IS CALLED THE LENDER AND THE PERSON OR A COMPANY WHO BORROWS MONEY IS CALLED THE BORROWER.
  • 47. WHAT IS LOAN? THE MONEY BORROWED FROM ANY FINANCIAL INSTITUTIONS IS KNOWN AS LOAN.THE AMOUNT OF LOAN MAY BIG OR SMALL DEPENDING UPON THE REQUIREMENT OF THE BORROWER.
  • 49. PRINCIPAL THE MONEY BORROWED BY BORROWER FROM A LEADER IS KNOWN AS PRINCIPAL OR SUM, INTEREST THE ADDITIONAL MONEY PAID BY BORROWER TO LENDER FOR HAVING USED HIS MONEY. AMOUNT THE TOTAL MONEY WHICH BORROWER PAYS BACK TO LENDER AT THE END OF THE SPECIFIED PERIOD.
  • 50. SIMPLE INTEREST IF INTEREST IS CALCULATED UNIFORMLY ON THE ORIGINAL PRINCIPAL THROUGHOUT THE LOAN PERIOD , IT IS CALLED SIMPLE INTEREST.
  • 51.
  • 52. IF RS. P IS THE PRINCIPAL AND INTEREST RATE IS R% PER ANNUM,THEN INTEREST ON RE 1 FOR T YEARS= RS R/100XT HENCE,INTEREST ON RS P FOR T YEARS = RS[R/100 X T X P]=RS PXRXT/100.
  • 53.
  • 54.
  • 55.