English-2
Grade-8
Easy

Question

Fill in the blanks with suitable conjunctions.
Be just ______ fear not.
.

  1. And
  2. Or
  3. Since
  4. None of the above

hintHint:

Conjunctions are part of speech that connect two or more words, phrases, clauses or sentences. Conjunctions are also called joining words. Example- both, nor, also etc.

The correct answer is: And


    Solution : Option (a) And
    Be just and fear not.
    "And" is a "Coordinating Conjunction word" . A Coordinating Conjunction connects words, phrases and clauses that are coordinate , or equal to each other. Here, "Be Just" and "Fear not" both have equal importance.

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    Grade-8
    Mathematics

    A cone has the radius of 156 cm and the height of 294 cm. Find the volume of the cone. Round your answer to the nearest tenth.

    Since, we have derived an expression for volume of the cone as 1 third πr squared straight h. Then, calculate the volume of the cone using the given data.
    Given that:
    Radius of the data = 156 cm
    Height of the cone = 294 cm
    Hence, The volume of the cone = 1 third πr squared straight h
    =fraction numerator 3.14 cross times 156 cross times 156 cross times 294 over denominator 3 end fraction
    =7488673.93 cm3.
    Therefore, Volume of the cone is 7488673.93 cubic centimeters.

    A cone has the radius of 156 cm and the height of 294 cm. Find the volume of the cone. Round your answer to the nearest tenth.

    MathematicsGrade-8

    Since, we have derived an expression for volume of the cone as 1 third πr squared straight h. Then, calculate the volume of the cone using the given data.
    Given that:
    Radius of the data = 156 cm
    Height of the cone = 294 cm
    Hence, The volume of the cone = 1 third πr squared straight h
    =fraction numerator 3.14 cross times 156 cross times 156 cross times 294 over denominator 3 end fraction
    =7488673.93 cm3.
    Therefore, Volume of the cone is 7488673.93 cubic centimeters.

    Grade-8
    Mathematics

    A cone has the radius of 0.8 meters and the height of 1.6 meters. Find the volume of the cone. Round your answer to the nearest tenth.

    Since, we have derived an expression for volume of the cone as  1 third πr squared straight h. Then, calculate the volume of the cone using the given data.
    Given that:
    Radius of the cone = 0.8 meters
    Height of the cone = 1.6 meters
    Hence, Volume of the cone = 1 third πr squared straight h
    fraction numerator 3.14 cross times 0.8 cross times 0.8 cross times 1.6 over denominator 3 end fraction
    = 1.0717 meters3.
    Therefore, Volume of the cone is 1.0717 ~ 1.07(rounded off to nearest tenth) cubic meters.

    A cone has the radius of 0.8 meters and the height of 1.6 meters. Find the volume of the cone. Round your answer to the nearest tenth.

    MathematicsGrade-8

    Since, we have derived an expression for volume of the cone as  1 third πr squared straight h. Then, calculate the volume of the cone using the given data.
    Given that:
    Radius of the cone = 0.8 meters
    Height of the cone = 1.6 meters
    Hence, Volume of the cone = 1 third πr squared straight h
    fraction numerator 3.14 cross times 0.8 cross times 0.8 cross times 1.6 over denominator 3 end fraction
    = 1.0717 meters3.
    Therefore, Volume of the cone is 1.0717 ~ 1.07(rounded off to nearest tenth) cubic meters.

    Grade-8
    Mathematics

    A cone has the radius of 10.3 meters and the height of 4.5 meters. Find the volume of the cone. Round your answer to the nearest tenth.

    Since, We have derived an expression for volume of the cone as  1 third πr squared straight h. Hence, evaluate volume of the cone using the given data in question.
    Given that:
    Radius of the cone = 10.3 meters
    Height of the cone = 4.5 meters
    Hence, Volume of the cone = 1 third πr squared straight h
    =fraction numerator 3.14 cross times 10.3 cross times 10.3 cross times 4.5 over denominator 3 end fraction
    =499.6839 meters3.
    Therefore, The volume of the Cone is 499.6839 ~ 499.68 cubic meters.

    A cone has the radius of 10.3 meters and the height of 4.5 meters. Find the volume of the cone. Round your answer to the nearest tenth.

    MathematicsGrade-8

    Since, We have derived an expression for volume of the cone as  1 third πr squared straight h. Hence, evaluate volume of the cone using the given data in question.
    Given that:
    Radius of the cone = 10.3 meters
    Height of the cone = 4.5 meters
    Hence, Volume of the cone = 1 third πr squared straight h
    =fraction numerator 3.14 cross times 10.3 cross times 10.3 cross times 4.5 over denominator 3 end fraction
    =499.6839 meters3.
    Therefore, The volume of the Cone is 499.6839 ~ 499.68 cubic meters.

    parallel
    Grade-8
    Mathematics

    A cone has the radius of 2 meters and the height of 5 meters. Find the volume of the cone. Round your answer to the nearest tenth.

    Since, we have derived an expression for volume of a cone as 1 third πr squared straight h. Then, Calculate the volume of a cone using the given data.
    Given that:
    Radius of a cone = 2 meters
    Height of a cone = 5 meters
    Hence, Volume of the cone = 1 third πr squared straight h
    =fraction numerator 3.14 cross times 2 cross times 2 cross times 5 over denominator 3 end fraction
    =20.93333 meters3.
    Therefore, The volume of the cone is 20.9333 ~ 20.94(rounded off to nearest tenth) cubic meters.

    A cone has the radius of 2 meters and the height of 5 meters. Find the volume of the cone. Round your answer to the nearest tenth.

    MathematicsGrade-8

    Since, we have derived an expression for volume of a cone as 1 third πr squared straight h. Then, Calculate the volume of a cone using the given data.
    Given that:
    Radius of a cone = 2 meters
    Height of a cone = 5 meters
    Hence, Volume of the cone = 1 third πr squared straight h
    =fraction numerator 3.14 cross times 2 cross times 2 cross times 5 over denominator 3 end fraction
    =20.93333 meters3.
    Therefore, The volume of the cone is 20.9333 ~ 20.94(rounded off to nearest tenth) cubic meters.

    Grade-8
    Mathematics

    The circumference of the base of the cone is 8.5π inches. Calculate the volume of the cone in terms of π. Round to the nearest hundredth.

    Since, we have derived an expression for Volume of a cone and circumference of a circle. Obtain Volume of the cone accordingly as follows:

    Given that:
    Circumference of the base of a cone = 8.5straight pi inches
    Height of a cone = 15 inches
    Hence, We know that Circumference of a base of a cone = 2πr
    = 8.5straight pi
    ** Radius of base of a  cone (r) = 17 over 4
    Hence, Volume of a cone = 1 third πr squared straight h
    fraction numerator 17 cross times 17 cross times 15 over denominator 3 cross times 4 cross times 4 end fractionstraight pi
    = 90.3125straight pi inches3.
    *** Volume of a cone is 90.3125straight pi ~ 90.31straight pi cubic inches.

    The circumference of the base of the cone is 8.5π inches. Calculate the volume of the cone in terms of π. Round to the nearest hundredth.

    MathematicsGrade-8

    Since, we have derived an expression for Volume of a cone and circumference of a circle. Obtain Volume of the cone accordingly as follows:

    Given that:
    Circumference of the base of a cone = 8.5straight pi inches
    Height of a cone = 15 inches
    Hence, We know that Circumference of a base of a cone = 2πr
    = 8.5straight pi
    ** Radius of base of a  cone (r) = 17 over 4
    Hence, Volume of a cone = 1 third πr squared straight h
    fraction numerator 17 cross times 17 cross times 15 over denominator 3 cross times 4 cross times 4 end fractionstraight pi
    = 90.3125straight pi inches3.
    *** Volume of a cone is 90.3125straight pi ~ 90.31straight pi cubic inches.

    Grade-8
    Mathematics

    A cone has the radius of 1.2 meters and the height of 3.5 meters. Find the volume of the cone. Round your answer to the nearest tenth.

    Since, we have calculated the volume of a cone as 1 third πr squared straight h. Hence, Obtain the volume of the cone using the given attributes of a cone given in the question.
    Given that:
    Radius of base of a cone = 1.2 meters
    Height of the cone = 3.5 meters
    Hence, Volume of the cone = 1 third πr squared straight h
    =fraction numerator 3.14 cross times 1.2 cross times 1.2 cross times 3.5 over denominator 3 end fraction
    =5.2752 meter3.
    *** Volume of the cone is 5.2752 ~ 5.28 cubic meters when it is rounded off to it's nearest tenth.

    A cone has the radius of 1.2 meters and the height of 3.5 meters. Find the volume of the cone. Round your answer to the nearest tenth.

    MathematicsGrade-8

    Since, we have calculated the volume of a cone as 1 third πr squared straight h. Hence, Obtain the volume of the cone using the given attributes of a cone given in the question.
    Given that:
    Radius of base of a cone = 1.2 meters
    Height of the cone = 3.5 meters
    Hence, Volume of the cone = 1 third πr squared straight h
    =fraction numerator 3.14 cross times 1.2 cross times 1.2 cross times 3.5 over denominator 3 end fraction
    =5.2752 meter3.
    *** Volume of the cone is 5.2752 ~ 5.28 cubic meters when it is rounded off to it's nearest tenth.

    parallel
    Grade-8
    Mathematics

    A cylinder and a cone have congruent bases and heights. _____________ will be the relationship of the volumes of the two figures.

    Assumption:
    Let, radius and height of the cylinder and cone are equal.
    Since, we have derived volume of cylinder as πr squared straight h and volume of cone 1 third πr squared straight h.
    Hence, fraction numerator V o l u m e space o f space c y l i n d e r over denominator V o l u m e space o f space c o n e end fraction spacefraction numerator πr squared straight h over denominator begin display style 1 third end style πr squared straight h end fraction
    fraction numerator V o l u m e space o f space c y l i n d e r over denominator V o l u m e space o f space c o n e end fraction space= 3;
    ***Volume of the cylinder = 3cross times Volume of the cone
    Volume of the cylinder is three times the volume of the cone.

    A cylinder and a cone have congruent bases and heights. _____________ will be the relationship of the volumes of the two figures.

    MathematicsGrade-8

    Assumption:
    Let, radius and height of the cylinder and cone are equal.
    Since, we have derived volume of cylinder as πr squared straight h and volume of cone 1 third πr squared straight h.
    Hence, fraction numerator V o l u m e space o f space c y l i n d e r over denominator V o l u m e space o f space c o n e end fraction spacefraction numerator πr squared straight h over denominator begin display style 1 third end style πr squared straight h end fraction
    fraction numerator V o l u m e space o f space c y l i n d e r over denominator V o l u m e space o f space c o n e end fraction space= 3;
    ***Volume of the cylinder = 3cross times Volume of the cone
    Volume of the cylinder is three times the volume of the cone.

    Grade-8
    Mathematics

    A cone has the radius of 2 inches and the height of 4 inches. Find the volume of the cone. Round your answer to the nearest tenth.

    Since, we have derived an expression for volume of a cone as 1 third πr squared straight h. Substitute the given attributes to find the volume of a cone.
    Given that:
    Radius of base of a cone = 2 inches
    Height of a cone = 4 inches
    Hence, Volume of a cone = 1 third πr squared straight h
    =fraction numerator 3.14 cross times 2 cross times 2 cross times 4 over denominator 3 end fraction
    =16.7467 inches3.
    *** Volume of a cone is 16.7567 ~ 16.76 cubic inches.

    A cone has the radius of 2 inches and the height of 4 inches. Find the volume of the cone. Round your answer to the nearest tenth.

    MathematicsGrade-8

    Since, we have derived an expression for volume of a cone as 1 third πr squared straight h. Substitute the given attributes to find the volume of a cone.
    Given that:
    Radius of base of a cone = 2 inches
    Height of a cone = 4 inches
    Hence, Volume of a cone = 1 third πr squared straight h
    =fraction numerator 3.14 cross times 2 cross times 2 cross times 4 over denominator 3 end fraction
    =16.7467 inches3.
    *** Volume of a cone is 16.7567 ~ 16.76 cubic inches.

    Grade-8
    Mathematics

    A cone has the radius of 10 inches and the height of 9 inches. Find the volume of the cone. Round your answer to the nearest tenth.

    Since, we have derived an expression for volume of a cone as 1 third πr squared straight h . Hence, calculate any attribute of a structure using the given data.
    Given that:
    Radius of a cone :  10 inches
    Height of a cone :   9 inches
    Hence, the volume of a cone = 1 third πr squared straight h
    =fraction numerator 3.1456 cross times 10 cross times 10 cross times 9 over denominator 3 end fraction
    =942.4876 inches3.
    Hence, volume of a cone is 942.4876 ~ 942.49 cubic inches.

    A cone has the radius of 10 inches and the height of 9 inches. Find the volume of the cone. Round your answer to the nearest tenth.

    MathematicsGrade-8

    Since, we have derived an expression for volume of a cone as 1 third πr squared straight h . Hence, calculate any attribute of a structure using the given data.
    Given that:
    Radius of a cone :  10 inches
    Height of a cone :   9 inches
    Hence, the volume of a cone = 1 third πr squared straight h
    =fraction numerator 3.1456 cross times 10 cross times 10 cross times 9 over denominator 3 end fraction
    =942.4876 inches3.
    Hence, volume of a cone is 942.4876 ~ 942.49 cubic inches.

    parallel
    Grade-8
    Mathematics

    A cone has the radius of 6 inches and the height of 5 inches. Find the volume of the cone. Round your answer to the nearest tenth.

    Since, we have derived an expression for volume of a cone as 1 third straight pir2h. Hence, just substitute values of a given attributes to find the volume of a cone.
    Given that:
                      Radius of base of a cone = 6 inches
                       Height of base of a cone = 5 inches
    Hence, Volume of a cone = 1 third straight pir2h
                                             =fraction numerator 3.14 cross times 6 cross times 6 cross times 5 over denominator 3 end fraction
                                             =188.49 inches3.
    ***Volume of a cone is 188.49 cubic inches.

    A cone has the radius of 6 inches and the height of 5 inches. Find the volume of the cone. Round your answer to the nearest tenth.

    MathematicsGrade-8

    Since, we have derived an expression for volume of a cone as 1 third straight pir2h. Hence, just substitute values of a given attributes to find the volume of a cone.
    Given that:
                      Radius of base of a cone = 6 inches
                       Height of base of a cone = 5 inches
    Hence, Volume of a cone = 1 third straight pir2h
                                             =fraction numerator 3.14 cross times 6 cross times 6 cross times 5 over denominator 3 end fraction
                                             =188.49 inches3.
    ***Volume of a cone is 188.49 cubic inches.

    Grade-8
    Mathematics

    Find the volume of corn held in this cone-shaped grain silo. Use 3.14 for π and round to the nearest cubic foot.

    Since, we have derived an expression for volume of a cone as  1 third πr to the power of 2 to the power of blank end exponentsquare root of l squared space minus space r squared end root. hence, substituting the values of radius and slant height values we can obtain volume of a cone easily.

    Given that:
    Slant height of a cone (l) = 10 feet
    Radius of a cone (r) = 5 feet
    Hence, volume of a cone is =   1 third πr to the power of 2 to the power of blank end exponentsquare root of l squared space minus space r squared end root
    =fraction numerator 3.14 cross times 6 cross times 6 cross times square root of 100 minus 36 end root over denominator 3 end fraction
    =fraction numerator 3.14 cross times 6 cross times 6 cross times 8 over denominator 3 end fraction
    = 301.44 feet3.
    Hence, Volume of a cone is 301.44 ~ 301 cubic feet.

    Find the volume of corn held in this cone-shaped grain silo. Use 3.14 for π and round to the nearest cubic foot.

    MathematicsGrade-8

    Since, we have derived an expression for volume of a cone as  1 third πr to the power of 2 to the power of blank end exponentsquare root of l squared space minus space r squared end root. hence, substituting the values of radius and slant height values we can obtain volume of a cone easily.

    Given that:
    Slant height of a cone (l) = 10 feet
    Radius of a cone (r) = 5 feet
    Hence, volume of a cone is =   1 third πr to the power of 2 to the power of blank end exponentsquare root of l squared space minus space r squared end root
    =fraction numerator 3.14 cross times 6 cross times 6 cross times square root of 100 minus 36 end root over denominator 3 end fraction
    =fraction numerator 3.14 cross times 6 cross times 6 cross times 8 over denominator 3 end fraction
    = 301.44 feet3.
    Hence, Volume of a cone is 301.44 ~ 301 cubic feet.

    Grade-8
    Mathematics

    A cone has the radius of 5.5 inches and the height of 12 inches. Find the volume of the cone. Round your answer to the nearest tenth.

    Since, we have derived the volume of the cone as 1 third straight pir2h. Then, just substitute the given values and find the volume of the cone.
    Given Data:
    Radius of the cone = 5.5 inches
    Height of the cone = 12 inches
    Hence, Volume of the Cone = 1 thirdstraight pir2h
    =fraction numerator 3.14 cross times 5.5 cross times 5.5 cross times 12 over denominator 3 end fraction
    =379.64
    ***Volume of the cone is 379.64.. ~ 380.13 inches3.

    A cone has the radius of 5.5 inches and the height of 12 inches. Find the volume of the cone. Round your answer to the nearest tenth.

    MathematicsGrade-8

    Since, we have derived the volume of the cone as 1 third straight pir2h. Then, just substitute the given values and find the volume of the cone.
    Given Data:
    Radius of the cone = 5.5 inches
    Height of the cone = 12 inches
    Hence, Volume of the Cone = 1 thirdstraight pir2h
    =fraction numerator 3.14 cross times 5.5 cross times 5.5 cross times 12 over denominator 3 end fraction
    =379.64
    ***Volume of the cone is 379.64.. ~ 380.13 inches3.

    parallel

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