Question:-
By selling a table for Rs. 1260, the seller loses 10%. At what price should he sell it so as to gain 25%
Information provided with us:
Selling price of table
Loss percent of table
What we have to find :
Solution :
[tex]\rm \implies \: C. P =( \dfrac{100}{100 - L \: \%} \times \:S . P )[/tex]
Note :
Now :
We know the given values
Here :
➡ Place the given values in this formula of C.P and solve
[tex]\rm \implies \: C. P =( \dfrac{100}{100 - 10 \: \%} \times \:1260 )[/tex]
[tex]\rm \implies \: C. P =( \dfrac{100}{90} \times \:1260 )[/tex]
[tex]\rm \implies \: C. P =( \dfrac{100 \times 1260}{90} )[/tex]
[tex]\rm \implies \: C. P =( \dfrac{126000}{90} )[/tex]
[tex]\bf \implies \: C. P = 1,400 \: Rs[/tex]
➡ Place the given values in this formula of S.P and solve
[tex]\rm \implies \: S.P=( \dfrac{100 +G \: \% }{100} \times \:C. P)[/tex]
[tex]\rm \implies \: S.P=( \dfrac{100 +25\: \% }{100} \times \:1,400)[/tex]
[tex]\rm \implies \: S.P=( \dfrac{125 }{100} \times \:1,400)[/tex]
[tex]\rm \implies \: S.P=( \dfrac{125 \times \:1,400}{100} )[/tex]
[tex]\rm \implies \: S.P=( \dfrac{175000}{100} )[/tex]
[tex]\bf \implies \: S.P=1,750[/tex]
Therefore :
➡ The required price should he sell it so as to gain 25% is 1,750 Rs .
Formula used :
Thanks.
Answer:1575
Step-by-step explanation:1260=100%
1260 times 10 divide by 100=126
126 times 125 divide 90=1575
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Verified answer
Question:-
By selling a table for Rs. 1260, the seller loses 10%. At what price should he sell it so as to gain 25%
Information provided with us:
Selling price of table
Loss percent of table
What we have to find :
Solution :
[tex]\rm \implies \: C. P =( \dfrac{100}{100 - L \: \%} \times \:S . P )[/tex]
Note :
Now :
We know the given values
Here :
➡ Place the given values in this formula of C.P and solve
[tex]\rm \implies \: C. P =( \dfrac{100}{100 - 10 \: \%} \times \:1260 )[/tex]
[tex]\rm \implies \: C. P =( \dfrac{100}{90} \times \:1260 )[/tex]
[tex]\rm \implies \: C. P =( \dfrac{100 \times 1260}{90} )[/tex]
[tex]\rm \implies \: C. P =( \dfrac{126000}{90} )[/tex]
[tex]\bf \implies \: C. P = 1,400 \: Rs[/tex]
Now :
We know the given values
Here :
➡ Place the given values in this formula of S.P and solve
[tex]\rm \implies \: S.P=( \dfrac{100 +G \: \% }{100} \times \:C. P)[/tex]
[tex]\rm \implies \: S.P=( \dfrac{100 +25\: \% }{100} \times \:1,400)[/tex]
[tex]\rm \implies \: S.P=( \dfrac{125 }{100} \times \:1,400)[/tex]
[tex]\rm \implies \: S.P=( \dfrac{125 \times \:1,400}{100} )[/tex]
[tex]\rm \implies \: S.P=( \dfrac{175000}{100} )[/tex]
[tex]\bf \implies \: S.P=1,750[/tex]
Therefore :
➡ The required price should he sell it so as to gain 25% is 1,750 Rs .
Formula used :
[tex]\rm \implies \: C. P =( \dfrac{100}{100 - L \: \%} \times \:S . P )[/tex]
[tex]\rm \implies \: S.P=( \dfrac{100 +G \: \% }{100} \times \:C. P)[/tex]
Thanks.
Answer:1575
Step-by-step explanation:1260=100%
1260 times 10 divide by 100=126
126 times 125 divide 90=1575